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Last change on this file was 19480, checked in by westram, 3 years ago
reintegrates 'gde' into 'trunk' adds: log:branches/gde@19460:19479
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1	/* RAxML-VI-HPC (version 2.2) a program for sequential and parallel estimation of phylogenetic trees
2	* Copyright August 2006 by Alexandros Stamatakis
3	*
4	* Partially derived from
5	* fastDNAml, a program for estimation of phylogenetic trees from sequences by Gary J. Olsen
6	*
7	* and
8	*
9	* Programs of the PHYLIP package by Joe Felsenstein.
10	*
11	* This program is free software; you may redistribute it and/or modify its
12	* under the terms of the GNU General Public License as published by the Free
13	* Software Foundation; either version 2 of the License, or (at your option)
14	* any later version.
15	*
16	* This program is distributed in the hope that it will be useful, but
17	* WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
18	* or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
19	* for more details.
20	*
21	*
22	* For any other enquiries send an Email to Alexandros Stamatakis
23	* Alexandros.Stamatakis@epfl.ch
24	*
25	* When publishing work that is based on the results from RAxML-VI-HPC please cite:
26	*
27	* Alexandros Stamatakis:"RAxML-VI-HPC: maximum likelihood-based phylogenetic analyses with thousands
28	* of taxa and mixed models".
29	* Bioinformatics 2006; doi: 10.1093/bioinformatics/btl446
30	*/
31
32	#ifndef WIN32
33	#include <sys/times.h>
34	#include <sys/types.h>
35	#include <sys/time.h>
36	#include <unistd.h>
37	#endif
38
39	#include <math.h>
40	#include <time.h>
41	#include <stdlib.h>
42	#include <stdio.h>
43	#include <ctype.h>
44	#include <string.h>
45
46	#include "axml.h"
47
48	extern int optimizeRatesInvocations;
49	extern int optimizeRateCategoryInvocations;
50	extern int optimizeAlphaInvocations;
51	extern int optimizeTTRatioInvocations;
52	extern int optimizeInvarInvocations;
53
54	extern const unsigned int bitVectorSecondary[256];
55	extern const unsigned int bitVector32[33];
56	extern const unsigned int bitVectorAA[23];
57	extern const unsigned int bitVectorIdentity[256];
58
59	extern const partitionLengths pLengths[MAX_MODEL];
60
61	#ifdef _USE_PTHREADS
62	extern volatile int NumberOfThreads;
63	#endif
64
65
66	extern char *protModels[NUM_PROT_MODELS];
67
68
69
70	static void smoothFreqs(const int n, double pfreqs, double dst, pInfo *partitionData)
71	{
72	int
73	countScale = 0,
74	l,
75	loopCounter = 0;
76
77
78	/*
79	for(l = 0; l < n; l++)
80	if(pfreqs[l] < FREQ_MIN)
81	countScale++;
82	*/
83
84	for(l = 0; l < n; l++)
85	if(pfreqs[l] == 0.0)
86	countScale++;
87
88	if(countScale > 0)
89	{
90	while(countScale > 0)
91	{
92	double correction = 0.0;
93	double factor = 1.0;
94
95	for(l = 0; l < n; l++)
96	{
97	if(pfreqs[l] == 0.0)
98	correction += FREQ_MIN;
99	else
100	if(pfreqs[l] < FREQ_MIN)
101	{
102	correction += (FREQ_MIN - pfreqs[l]);
103	factor -= (FREQ_MIN - pfreqs[l]);
104	}
105	}
106
107	countScale = 0;
108
109	for(l = 0; l < n; l++)
110	{
111	if(pfreqs[l] >= FREQ_MIN)
112	pfreqs[l] = pfreqs[l] - (pfreqs[l] * correction * factor);
113	else
114	pfreqs[l] = FREQ_MIN;
115
116	if(pfreqs[l] < FREQ_MIN)
117	countScale++;
118	}
119	assert(loopCounter < 100);
120	loopCounter++;
121	}
122	}
123
124	for(l = 0; l < n; l++)
125	dst[l] = pfreqs[l];
126
127
128	if(partitionData->nonGTR)
129	{
130	int k;
131
132	assert(partitionData->dataType == SECONDARY_DATA_7 \|\| partitionData->dataType == SECONDARY_DATA_6 \|\| partitionData->dataType == SECONDARY_DATA);
133
134	for(l = 0; l < n; l++)
135	{
136	int count = 1;
137
138	for(k = 0; k < n; k++)
139	{
140	if(k != l && partitionData->frequencyGrouping[l] == partitionData->frequencyGrouping[k])
141	{
142	count++;
143	dst[l] += pfreqs[k];
144	}
145	}
146	dst[l] /= ((double)count);
147	}
148	}
149	}
150
151
152	static void genericBaseFrequencies(tree tr, const int numFreqs, rawdata rdta, cruncheddata *cdta, int lower, int upper, int model, boolean smoothFrequencies,
153	const unsigned int *bitMask)
154	{
155	double
156	wj,
157	acc,
158	pfreqs[64],
159	sumf[64],
160	temp[64];
161
162	int
163	i,
164	j,
165	k,
166	l;
167
168	unsigned char *yptr;
169
170	for(l = 0; l < numFreqs; l++)
171	pfreqs[l] = 1.0 / ((double)numFreqs);
172
173	for (k = 1; k <= 8; k++)
174	{
175	for(l = 0; l < numFreqs; l++)
176	sumf[l] = 0.0;
177
178	for (i = 0; i < rdta->numsp; i++)
179	{
180	yptr = &(rdta->y0[((size_t)i) * ((size_t)tr->originalCrunchedLength)]);
181
182	for(j = lower; j < upper; j++)
183	{
184	unsigned int code = bitMask[yptr[j]];
185	assert(code >= 1);
186
187	for(l = 0; l < numFreqs; l++)
188	{
189	if((code >> l) & 1)
190	temp[l] = pfreqs[l];
191	else
192	temp[l] = 0.0;
193	}
194
195	for(l = 0, acc = 0.0; l < numFreqs; l++)
196	{
197	if(temp[l] != 0.0)
198	acc += temp[l];
199	}
200
201	wj = ((double)cdta->aliaswgt[j]) / acc;
202
203	for(l = 0; l < numFreqs; l++)
204	{
205	if(temp[l] != 0.0)
206	sumf[l] += wj * temp[l];
207	}
208	}
209	}
210
211	for(l = 0, acc = 0.0; l < numFreqs; l++)
212	{
213	if(sumf[l] != 0.0)
214	acc += sumf[l];
215	}
216
217	for(l = 0; l < numFreqs; l++)
218	pfreqs[l] = sumf[l] / acc;
219	}
220
221	if(smoothFrequencies)
222	smoothFreqs(numFreqs, pfreqs, tr->partitionData[model].frequencies, &(tr->partitionData[model]));
223	else
224	{
225	boolean
226	zeroFreq = FALSE;
227
228	char
229	typeOfData[1024];
230
231	getDataTypeString(tr, model, typeOfData);
232
233	for(l = 0; l < numFreqs; l++)
234	{
235	if(pfreqs[l] == 0.0)
236	{
237	printBothOpen("Empirical base frequency for state number %d is equal to zero in %s data partition %s\n", l, typeOfData, tr->partitionData[model].partitionName);
238	printBothOpen("Since this is probably not what you want to do, RAxML will soon exit.\n\n");
239	zeroFreq = TRUE;
240	}
241	}
242
243	if(zeroFreq)
244	exit(-1);
245
246	for(l = 0; l < numFreqs; l++)
247	{
248	assert(pfreqs[l] > 0.0);
249	tr->partitionData[model].frequencies[l] = pfreqs[l];
250	}
251	}
252
253	}
254
255
256
257
258
259
260
261
262	static void baseFrequenciesGTR(rawdata rdta, cruncheddata cdta, tree *tr)
263	{
264	int
265	model,
266	lower,
267	upper,
268	states;
269
270	for(model = 0; model < tr->NumberOfModels; model++)
271	{
272	lower = tr->partitionData[model].lower;
273	upper = tr->partitionData[model].upper;
274	states = tr->partitionData[model].states;
275
276	switch(tr->partitionData[model].dataType)
277	{
278	case GENERIC_32:
279	switch(tr->multiStateModel)
280	{
281	case ORDERED_MULTI_STATE:
282	case MK_MULTI_STATE:
283	{
284	int i;
285	double
286	freq = 1.0 / (double)states,
287	acc = 0.0;
288
289	for(i = 0; i < states; i++)
290	{
291	acc += freq;
292	tr->partitionData[model].frequencies[i] = freq;
293	/printf("%f \n", freq);/
294	}
295	/printf("Frequency Deviation: %1.60f\n", acc);/
296	}
297	break;
298	case GTR_MULTI_STATE:
299	genericBaseFrequencies(tr, states, rdta, cdta, lower, upper, model, TRUE,
300	bitVector32);
301	break;
302	default:
303	assert(0);
304	}
305	break;
306	case GENERIC_64:
307	assert(0);
308	break;
309	case SECONDARY_DATA_6:
310	case SECONDARY_DATA_7:
311	case SECONDARY_DATA:
312	case AA_DATA:
313	case DNA_DATA:
314	case BINARY_DATA:
315	genericBaseFrequencies(tr, states, rdta, cdta, lower, upper, model,
316	getSmoothFreqs(tr->partitionData[model].dataType),
317	getBitVector(tr->partitionData[model].dataType));
318	break;
319	default:
320	assert(0);
321	}
322	}
323
324	return;
325	}
326
327	static void putWAG(double *ext_initialRates)
328	{
329	double
330	scaler,
331	q[20][20],
332	daa[400];
333
334	int
335	i,
336	j,
337	r;
338
339	daa[ 120+ 0] = 55.15710; daa[ 220+ 0] = 50.98480; daa[ 2*20+ 1] = 63.53460;
340	daa[ 320+ 0] = 73.89980; daa[ 320+ 1] = 14.73040; daa[ 3*20+ 2] = 542.94200;
341	daa[ 420+ 0] = 102.70400; daa[ 420+ 1] = 52.81910; daa[ 4*20+ 2] = 26.52560;
342	daa[ 420+ 3] = 3.02949; daa[ 520+ 0] = 90.85980; daa[ 5*20+ 1] = 303.55000;
343	daa[ 520+ 2] = 154.36400; daa[ 520+ 3] = 61.67830; daa[ 5*20+ 4] = 9.88179;
344	daa[ 620+ 0] = 158.28500; daa[ 620+ 1] = 43.91570; daa[ 6*20+ 2] = 94.71980;
345	daa[ 620+ 3] = 617.41600; daa[ 620+ 4] = 2.13520; daa[ 6*20+ 5] = 546.94700;
346	daa[ 720+ 0] = 141.67200; daa[ 720+ 1] = 58.46650; daa[ 7*20+ 2] = 112.55600;
347	daa[ 720+ 3] = 86.55840; daa[ 720+ 4] = 30.66740; daa[ 7*20+ 5] = 33.00520;
348	daa[ 720+ 6] = 56.77170; daa[ 820+ 0] = 31.69540; daa[ 8*20+ 1] = 213.71500;
349	daa[ 820+ 2] = 395.62900; daa[ 820+ 3] = 93.06760; daa[ 8*20+ 4] = 24.89720;
350	daa[ 820+ 5] = 429.41100; daa[ 820+ 6] = 57.00250; daa[ 8*20+ 7] = 24.94100;
351	daa[ 920+ 0] = 19.33350; daa[ 920+ 1] = 18.69790; daa[ 9*20+ 2] = 55.42360;
352	daa[ 920+ 3] = 3.94370; daa[ 920+ 4] = 17.01350; daa[ 9*20+ 5] = 11.39170;
353	daa[ 920+ 6] = 12.73950; daa[ 920+ 7] = 3.04501; daa[ 9*20+ 8] = 13.81900;
354	daa[1020+ 0] = 39.79150; daa[1020+ 1] = 49.76710; daa[10*20+ 2] = 13.15280;
355	daa[1020+ 3] = 8.48047; daa[1020+ 4] = 38.42870; daa[10*20+ 5] = 86.94890;
356	daa[1020+ 6] = 15.42630; daa[1020+ 7] = 6.13037; daa[10*20+ 8] = 49.94620;
357	daa[1020+ 9] = 317.09700; daa[1120+ 0] = 90.62650; daa[11*20+ 1] = 535.14200;
358	daa[1120+ 2] = 301.20100; daa[1120+ 3] = 47.98550; daa[11*20+ 4] = 7.40339;
359	daa[1120+ 5] = 389.49000; daa[1120+ 6] = 258.44300; daa[11*20+ 7] = 37.35580;
360	daa[1120+ 8] = 89.04320; daa[1120+ 9] = 32.38320; daa[11*20+10] = 25.75550;
361	daa[1220+ 0] = 89.34960; daa[1220+ 1] = 68.31620; daa[12*20+ 2] = 19.82210;
362	daa[1220+ 3] = 10.37540; daa[1220+ 4] = 39.04820; daa[12*20+ 5] = 154.52600;
363	daa[1220+ 6] = 31.51240; daa[1220+ 7] = 17.41000; daa[12*20+ 8] = 40.41410;
364	daa[1220+ 9] = 425.74600; daa[1220+10] = 485.40200; daa[12*20+11] = 93.42760;
365	daa[1320+ 0] = 21.04940; daa[1320+ 1] = 10.27110; daa[13*20+ 2] = 9.61621;
366	daa[1320+ 3] = 4.67304; daa[1320+ 4] = 39.80200; daa[13*20+ 5] = 9.99208;
367	daa[1320+ 6] = 8.11339; daa[1320+ 7] = 4.99310; daa[13*20+ 8] = 67.93710;
368	daa[1320+ 9] = 105.94700; daa[1320+10] = 211.51700; daa[13*20+11] = 8.88360;
369	daa[1320+12] = 119.06300; daa[1420+ 0] = 143.85500; daa[14*20+ 1] = 67.94890;
370	daa[1420+ 2] = 19.50810; daa[1420+ 3] = 42.39840; daa[14*20+ 4] = 10.94040;
371	daa[1420+ 5] = 93.33720; daa[1420+ 6] = 68.23550; daa[14*20+ 7] = 24.35700;
372	daa[1420+ 8] = 69.61980; daa[1420+ 9] = 9.99288; daa[14*20+10] = 41.58440;
373	daa[1420+11] = 55.68960; daa[1420+12] = 17.13290; daa[14*20+13] = 16.14440;
374	daa[1520+ 0] = 337.07900; daa[1520+ 1] = 122.41900; daa[15*20+ 2] = 397.42300;
375	daa[1520+ 3] = 107.17600; daa[1520+ 4] = 140.76600; daa[15*20+ 5] = 102.88700;
376	daa[1520+ 6] = 70.49390; daa[1520+ 7] = 134.18200; daa[15*20+ 8] = 74.01690;
377	daa[1520+ 9] = 31.94400; daa[1520+10] = 34.47390; daa[15*20+11] = 96.71300;
378	daa[1520+12] = 49.39050; daa[1520+13] = 54.59310; daa[15*20+14] = 161.32800;
379	daa[1620+ 0] = 212.11100; daa[1620+ 1] = 55.44130; daa[16*20+ 2] = 203.00600;
380	daa[1620+ 3] = 37.48660; daa[1620+ 4] = 51.29840; daa[16*20+ 5] = 85.79280;
381	daa[1620+ 6] = 82.27650; daa[1620+ 7] = 22.58330; daa[16*20+ 8] = 47.33070;
382	daa[1620+ 9] = 145.81600; daa[1620+10] = 32.66220; daa[16*20+11] = 138.69800;
383	daa[1620+12] = 151.61200; daa[1620+13] = 17.19030; daa[16*20+14] = 79.53840;
384	daa[1620+15] = 437.80200; daa[1720+ 0] = 11.31330; daa[17*20+ 1] = 116.39200;
385	daa[1720+ 2] = 7.19167; daa[1720+ 3] = 12.97670; daa[17*20+ 4] = 71.70700;
386	daa[1720+ 5] = 21.57370; daa[1720+ 6] = 15.65570; daa[17*20+ 7] = 33.69830;
387	daa[1720+ 8] = 26.25690; daa[1720+ 9] = 21.24830; daa[17*20+10] = 66.53090;
388	daa[1720+11] = 13.75050; daa[1720+12] = 51.57060; daa[17*20+13] = 152.96400;
389	daa[1720+14] = 13.94050; daa[1720+15] = 52.37420; daa[17*20+16] = 11.08640;
390	daa[1820+ 0] = 24.07350; daa[1820+ 1] = 38.15330; daa[18*20+ 2] = 108.60000;
391	daa[1820+ 3] = 32.57110; daa[1820+ 4] = 54.38330; daa[18*20+ 5] = 22.77100;
392	daa[1820+ 6] = 19.63030; daa[1820+ 7] = 10.36040; daa[18*20+ 8] = 387.34400;
393	daa[1820+ 9] = 42.01700; daa[1820+10] = 39.86180; daa[18*20+11] = 13.32640;
394	daa[1820+12] = 42.84370; daa[1820+13] = 645.42800; daa[18*20+14] = 21.60460;
395	daa[1820+15] = 78.69930; daa[1820+16] = 29.11480; daa[18*20+17] = 248.53900;
396	daa[1920+ 0] = 200.60100; daa[1920+ 1] = 25.18490; daa[19*20+ 2] = 19.62460;
397	daa[1920+ 3] = 15.23350; daa[1920+ 4] = 100.21400; daa[19*20+ 5] = 30.12810;
398	daa[1920+ 6] = 58.87310; daa[1920+ 7] = 18.72470; daa[19*20+ 8] = 11.83580;
399	daa[1920+ 9] = 782.13000; daa[1920+10] = 180.03400; daa[19*20+11] = 30.54340;
400	daa[1920+12] = 205.84500; daa[1920+13] = 64.98920; daa[19*20+14] = 31.48870;
401	daa[1920+15] = 23.27390; daa[1920+16] = 138.82300; daa[19*20+17] = 36.53690;
402	daa[19*20+18] = 31.47300;
403
404	for(i = 0; i < 20; i++)
405	for(j = 0; j < 20; j++)
406	q[i][j] = 0.0;
407
408	for (i=0; i<20; i++)
409	for (j=0; j<i; j++)
410	daa[j20+i] = daa[i20+j];
411
412	for(i = 0; i < 19; i++)
413	for(j = i + 1; j < 20; j++)
414	q[i][j] = daa[i * 20 + j];
415
416
417	/*
418	for (i=0; i<20; i++)
419	{
420	for (j=0; j<20; j++)
421	printf("%1.2f ", q[i][j]);
422	printf("\n");
423	}
424	printf("\n");
425
426	printf("%f\n", q[18][19]);
427	*/
428
429	scaler = 1.0 / q[18][19];
430
431
432
433	for(i = 0; i < 19; i++)
434	for(j = i + 1; j < 20; j++)
435	q[i][j] *= scaler;
436
437	for(i = 0, r = 0; i < 19; i++)
438	for(j = i + 1; j < 20; j++)
439	ext_initialRates[r++] = q[i][j];
440
441	/*
442	for (i=0; i<20; i++)
443	{
444	for (j=0; j<20; j++)
445	printf("%1.2f ", q[i][j]);
446	printf("\n");
447	}
448	printf("\n");
449	*/
450
451	}
452
453	static void initProtMat(double f[20], int proteinMatrix, double ext_initialRates, int model, tree tr, int lg4_index)
454	{
455	double q[20][20];
456	double daa[400], max, temp;
457	double *initialRates = ext_initialRates;
458	double scaler;
459
460	{
461	switch(proteinMatrix)
462	{
463	case PROT_FILE:
464	memcpy(daa, tr->partitionData[model].externalAAMatrix, 400 * sizeof(double));
465	memcpy(f, &(tr->partitionData[model].externalAAMatrix[400]), 20 * sizeof(double));
466	break;
467	case DAYHOFF:
468	{
469	daa[ 120+ 0] = 27.00; daa[ 220+ 0] = 98.00; daa[ 220+ 1] = 32.00; daa[ 320+ 0] = 120.00;
470	daa[ 320+ 1] = 0.00; daa[ 320+ 2] = 905.00; daa[ 420+ 0] = 36.00; daa[ 420+ 1] = 23.00;
471	daa[ 420+ 2] = 0.00; daa[ 420+ 3] = 0.00; daa[ 520+ 0] = 89.00; daa[ 520+ 1] = 246.00;
472	daa[ 520+ 2] = 103.00; daa[ 520+ 3] = 134.00; daa[ 520+ 4] = 0.00; daa[ 620+ 0] = 198.00;
473	daa[ 620+ 1] = 1.00; daa[ 620+ 2] = 148.00; daa[ 620+ 3] = 1153.00; daa[ 620+ 4] = 0.00;
474	daa[ 620+ 5] = 716.00; daa[ 720+ 0] = 240.00; daa[ 720+ 1] = 9.00; daa[ 720+ 2] = 139.00;
475	daa[ 720+ 3] = 125.00; daa[ 720+ 4] = 11.00; daa[ 720+ 5] = 28.00; daa[ 720+ 6] = 81.00;
476	daa[ 820+ 0] = 23.00; daa[ 820+ 1] = 240.00; daa[ 820+ 2] = 535.00; daa[ 820+ 3] = 86.00;
477	daa[ 820+ 4] = 28.00; daa[ 820+ 5] = 606.00; daa[ 820+ 6] = 43.00; daa[ 820+ 7] = 10.00;
478	daa[ 920+ 0] = 65.00; daa[ 920+ 1] = 64.00; daa[ 920+ 2] = 77.00; daa[ 920+ 3] = 24.00;
479	daa[ 920+ 4] = 44.00; daa[ 920+ 5] = 18.00; daa[ 920+ 6] = 61.00; daa[ 920+ 7] = 0.00;
480	daa[ 920+ 8] = 7.00; daa[1020+ 0] = 41.00; daa[1020+ 1] = 15.00; daa[1020+ 2] = 34.00;
481	daa[1020+ 3] = 0.00; daa[1020+ 4] = 0.00; daa[1020+ 5] = 73.00; daa[1020+ 6] = 11.00;
482	daa[1020+ 7] = 7.00; daa[1020+ 8] = 44.00; daa[1020+ 9] = 257.00; daa[1120+ 0] = 26.00;
483	daa[1120+ 1] = 464.00; daa[1120+ 2] = 318.00; daa[1120+ 3] = 71.00; daa[1120+ 4] = 0.00;
484	daa[1120+ 5] = 153.00; daa[1120+ 6] = 83.00; daa[1120+ 7] = 27.00; daa[1120+ 8] = 26.00;
485	daa[1120+ 9] = 46.00; daa[1120+10] = 18.00; daa[1220+ 0] = 72.00; daa[1220+ 1] = 90.00;
486	daa[1220+ 2] = 1.00; daa[1220+ 3] = 0.00; daa[1220+ 4] = 0.00; daa[1220+ 5] = 114.00;
487	daa[1220+ 6] = 30.00; daa[1220+ 7] = 17.00; daa[1220+ 8] = 0.00; daa[1220+ 9] = 336.00;
488	daa[1220+10] = 527.00; daa[1220+11] = 243.00; daa[1320+ 0] = 18.00; daa[1320+ 1] = 14.00;
489	daa[1320+ 2] = 14.00; daa[1320+ 3] = 0.00; daa[1320+ 4] = 0.00; daa[1320+ 5] = 0.00;
490	daa[1320+ 6] = 0.00; daa[1320+ 7] = 15.00; daa[1320+ 8] = 48.00; daa[1320+ 9] = 196.00;
491	daa[1320+10] = 157.00; daa[1320+11] = 0.00; daa[1320+12] = 92.00; daa[1420+ 0] = 250.00;
492	daa[1420+ 1] = 103.00; daa[1420+ 2] = 42.00; daa[1420+ 3] = 13.00; daa[1420+ 4] = 19.00;
493	daa[1420+ 5] = 153.00; daa[1420+ 6] = 51.00; daa[1420+ 7] = 34.00; daa[1420+ 8] = 94.00;
494	daa[1420+ 9] = 12.00; daa[1420+10] = 32.00; daa[1420+11] = 33.00; daa[1420+12] = 17.00;
495	daa[1420+13] = 11.00; daa[1520+ 0] = 409.00; daa[1520+ 1] = 154.00; daa[1520+ 2] = 495.00;
496	daa[1520+ 3] = 95.00; daa[1520+ 4] = 161.00; daa[1520+ 5] = 56.00; daa[1520+ 6] = 79.00;
497	daa[1520+ 7] = 234.00; daa[1520+ 8] = 35.00; daa[1520+ 9] = 24.00; daa[1520+10] = 17.00;
498	daa[1520+11] = 96.00; daa[1520+12] = 62.00; daa[1520+13] = 46.00; daa[1520+14] = 245.00;
499	daa[1620+ 0] = 371.00; daa[1620+ 1] = 26.00; daa[1620+ 2] = 229.00; daa[1620+ 3] = 66.00;
500	daa[1620+ 4] = 16.00; daa[1620+ 5] = 53.00; daa[1620+ 6] = 34.00; daa[1620+ 7] = 30.00;
501	daa[1620+ 8] = 22.00; daa[1620+ 9] = 192.00; daa[1620+10] = 33.00; daa[1620+11] = 136.00;
502	daa[1620+12] = 104.00; daa[1620+13] = 13.00; daa[1620+14] = 78.00; daa[1620+15] = 550.00;
503	daa[1720+ 0] = 0.00; daa[1720+ 1] = 201.00; daa[1720+ 2] = 23.00; daa[1720+ 3] = 0.00;
504	daa[1720+ 4] = 0.00; daa[1720+ 5] = 0.00; daa[1720+ 6] = 0.00; daa[1720+ 7] = 0.00;
505	daa[1720+ 8] = 27.00; daa[1720+ 9] = 0.00; daa[1720+10] = 46.00; daa[1720+11] = 0.00;
506	daa[1720+12] = 0.00; daa[1720+13] = 76.00; daa[1720+14] = 0.00; daa[1720+15] = 75.00;
507	daa[1720+16] = 0.00; daa[1820+ 0] = 24.00; daa[1820+ 1] = 8.00; daa[1820+ 2] = 95.00;
508	daa[1820+ 3] = 0.00; daa[1820+ 4] = 96.00; daa[1820+ 5] = 0.00; daa[1820+ 6] = 22.00;
509	daa[1820+ 7] = 0.00; daa[1820+ 8] = 127.00; daa[1820+ 9] = 37.00; daa[1820+10] = 28.00;
510	daa[1820+11] = 13.00; daa[1820+12] = 0.00; daa[1820+13] = 698.00; daa[1820+14] = 0.00;
511	daa[1820+15] = 34.00; daa[1820+16] = 42.00; daa[1820+17] = 61.00; daa[1920+ 0] = 208.00;
512	daa[1920+ 1] = 24.00; daa[1920+ 2] = 15.00; daa[1920+ 3] = 18.00; daa[1920+ 4] = 49.00;
513	daa[1920+ 5] = 35.00; daa[1920+ 6] = 37.00; daa[1920+ 7] = 54.00; daa[1920+ 8] = 44.00;
514	daa[1920+ 9] = 889.00; daa[1920+10] = 175.00; daa[1920+11] = 10.00; daa[1920+12] = 258.00;
515	daa[1920+13] = 12.00; daa[1920+14] = 48.00; daa[1920+15] = 30.00; daa[1920+16] = 157.00;
516	daa[1920+17] = 0.00; daa[1920+18] = 28.00;
517
518
519	f[ 0] = 0.087000; f[ 1] = 0.041000; f[ 2] = 0.040000; f[ 3] = 0.047000;
520	f[ 4] = 0.034000; f[ 5] = 0.038000; f[ 6] = 0.050000; f[ 7] = 0.089000;
521	f[ 8] = 0.034000; f[ 9] = 0.037000; f[10] = 0.085000; f[11] = 0.080000;
522	f[12] = 0.014000; f[13] = 0.040000; f[14] = 0.051000; f[15] = 0.070000;
523	f[16] = 0.058000; f[17] = 0.011000; f[18] = 0.030000; f[19] = 0.064000;
524	}
525	break;
526	case DCMUT:
527	{
528	daa[ 120+ 0] = 26.78280; daa[ 220+ 0] = 98.44740; daa[ 220+ 1] = 32.70590; daa[ 320+ 0] = 119.98050;
529	daa[ 320+ 1] = 0.00000; daa[ 320+ 2] = 893.15150; daa[ 420+ 0] = 36.00160; daa[ 420+ 1] = 23.23740;
530	daa[ 420+ 2] = 0.00000; daa[ 420+ 3] = 0.00000; daa[ 520+ 0] = 88.77530; daa[ 520+ 1] = 243.99390;
531	daa[ 520+ 2] = 102.85090; daa[ 520+ 3] = 134.85510; daa[ 520+ 4] = 0.00000; daa[ 620+ 0] = 196.11670;
532	daa[ 620+ 1] = 0.00000; daa[ 620+ 2] = 149.34090; daa[ 620+ 3] = 1138.86590; daa[ 620+ 4] = 0.00000;
533	daa[ 620+ 5] = 708.60220; daa[ 720+ 0] = 238.61110; daa[ 720+ 1] = 8.77910; daa[ 720+ 2] = 138.53520;
534	daa[ 720+ 3] = 124.09810; daa[ 720+ 4] = 10.72780; daa[ 720+ 5] = 28.15810; daa[ 720+ 6] = 81.19070;
535	daa[ 820+ 0] = 22.81160; daa[ 820+ 1] = 238.31480; daa[ 820+ 2] = 529.00240; daa[ 820+ 3] = 86.82410;
536	daa[ 820+ 4] = 28.27290; daa[ 820+ 5] = 601.16130; daa[ 820+ 6] = 43.94690; daa[ 820+ 7] = 10.68020;
537	daa[ 920+ 0] = 65.34160; daa[ 920+ 1] = 63.26290; daa[ 920+ 2] = 76.80240; daa[ 920+ 3] = 23.92480;
538	daa[ 920+ 4] = 43.80740; daa[ 920+ 5] = 18.03930; daa[ 920+ 6] = 60.95260; daa[ 920+ 7] = 0.00000;
539	daa[ 920+ 8] = 7.69810; daa[1020+ 0] = 40.64310; daa[1020+ 1] = 15.49240; daa[1020+ 2] = 34.11130;
540	daa[1020+ 3] = 0.00000; daa[1020+ 4] = 0.00000; daa[1020+ 5] = 73.07720; daa[1020+ 6] = 11.28800;
541	daa[1020+ 7] = 7.15140; daa[1020+ 8] = 44.35040; daa[1020+ 9] = 255.66850; daa[1120+ 0] = 25.86350;
542	daa[1120+ 1] = 461.01240; daa[1120+ 2] = 314.83710; daa[1120+ 3] = 71.69130; daa[1120+ 4] = 0.00000;
543	daa[1120+ 5] = 151.90780; daa[1120+ 6] = 83.00780; daa[1120+ 7] = 26.76830; daa[1120+ 8] = 27.04750;
544	daa[1120+ 9] = 46.08570; daa[1120+10] = 18.06290; daa[1220+ 0] = 71.78400; daa[1220+ 1] = 89.63210;
545	daa[1220+ 2] = 0.00000; daa[1220+ 3] = 0.00000; daa[1220+ 4] = 0.00000; daa[1220+ 5] = 112.74990;
546	daa[1220+ 6] = 30.48030; daa[1220+ 7] = 17.03720; daa[1220+ 8] = 0.00000; daa[1220+ 9] = 333.27320;
547	daa[1220+10] = 523.01150; daa[1220+11] = 241.17390; daa[1320+ 0] = 18.36410; daa[1320+ 1] = 13.69060;
548	daa[1320+ 2] = 13.85030; daa[1320+ 3] = 0.00000; daa[1320+ 4] = 0.00000; daa[1320+ 5] = 0.00000;
549	daa[1320+ 6] = 0.00000; daa[1320+ 7] = 15.34780; daa[1320+ 8] = 47.59270; daa[1320+ 9] = 195.19510;
550	daa[1320+10] = 156.51600; daa[1320+11] = 0.00000; daa[1320+12] = 92.18600; daa[1420+ 0] = 248.59200;
551	daa[1420+ 1] = 102.83130; daa[1420+ 2] = 41.92440; daa[1420+ 3] = 13.39400; daa[1420+ 4] = 18.75500;
552	daa[1420+ 5] = 152.61880; daa[1420+ 6] = 50.70030; daa[1420+ 7] = 34.71530; daa[1420+ 8] = 93.37090;
553	daa[1420+ 9] = 11.91520; daa[1420+10] = 31.62580; daa[1420+11] = 33.54190; daa[1420+12] = 17.02050;
554	daa[1420+13] = 11.05060; daa[1520+ 0] = 405.18700; daa[1520+ 1] = 153.15900; daa[1520+ 2] = 488.58920;
555	daa[1520+ 3] = 95.60970; daa[1520+ 4] = 159.83560; daa[1520+ 5] = 56.18280; daa[1520+ 6] = 79.39990;
556	daa[1520+ 7] = 232.22430; daa[1520+ 8] = 35.36430; daa[1520+ 9] = 24.79550; daa[1520+10] = 17.14320;
557	daa[1520+11] = 95.45570; daa[1520+12] = 61.99510; daa[1520+13] = 45.99010; daa[1520+14] = 242.72020;
558	daa[1620+ 0] = 368.03650; daa[1620+ 1] = 26.57450; daa[1620+ 2] = 227.16970; daa[1620+ 3] = 66.09300;
559	daa[1620+ 4] = 16.23660; daa[1620+ 5] = 52.56510; daa[1620+ 6] = 34.01560; daa[1620+ 7] = 30.66620;
560	daa[1620+ 8] = 22.63330; daa[1620+ 9] = 190.07390; daa[1620+10] = 33.10900; daa[1620+11] = 135.05990;
561	daa[1620+12] = 103.15340; daa[1620+13] = 13.66550; daa[1620+14] = 78.28570; daa[1620+15] = 543.66740;
562	daa[1720+ 0] = 0.00000; daa[1720+ 1] = 200.13750; daa[1720+ 2] = 22.49680; daa[1720+ 3] = 0.00000;
563	daa[1720+ 4] = 0.00000; daa[1720+ 5] = 0.00000; daa[1720+ 6] = 0.00000; daa[1720+ 7] = 0.00000;
564	daa[1720+ 8] = 27.05640; daa[1720+ 9] = 0.00000; daa[1720+10] = 46.17760; daa[1720+11] = 0.00000;
565	daa[1720+12] = 0.00000; daa[1720+13] = 76.23540; daa[1720+14] = 0.00000; daa[1720+15] = 74.08190;
566	daa[1720+16] = 0.00000; daa[1820+ 0] = 24.41390; daa[1820+ 1] = 7.80120; daa[1820+ 2] = 94.69400;
567	daa[1820+ 3] = 0.00000; daa[1820+ 4] = 95.31640; daa[1820+ 5] = 0.00000; daa[1820+ 6] = 21.47170;
568	daa[1820+ 7] = 0.00000; daa[1820+ 8] = 126.54000; daa[1820+ 9] = 37.48340; daa[1820+10] = 28.65720;
569	daa[1820+11] = 13.21420; daa[1820+12] = 0.00000; daa[1820+13] = 695.26290; daa[1820+14] = 0.00000;
570	daa[1820+15] = 33.62890; daa[1820+16] = 41.78390; daa[1820+17] = 60.80700; daa[1920+ 0] = 205.95640;
571	daa[1920+ 1] = 24.03680; daa[1920+ 2] = 15.80670; daa[1920+ 3] = 17.83160; daa[1920+ 4] = 48.46780;
572	daa[1920+ 5] = 34.69830; daa[1920+ 6] = 36.72500; daa[1920+ 7] = 53.81650; daa[1920+ 8] = 43.87150;
573	daa[1920+ 9] = 881.00380; daa[1920+10] = 174.51560; daa[1920+11] = 10.38500; daa[1920+12] = 256.59550;
574	daa[1920+13] = 12.36060; daa[1920+14] = 48.50260; daa[1920+15] = 30.38360; daa[1920+16] = 156.19970;
575	daa[1920+17] = 0.00000; daa[1920+18] = 27.93790;
576
577	f[ 0] = 0.08700; f[ 1] = 0.04100; f[ 2] = 0.04000; f[ 3] = 0.04700;
578	f[ 4] = 0.03300; f[ 5] = 0.03800; f[ 6] = 0.04900; f[ 7] = 0.08900;
579	f[ 8] = 0.03400; f[ 9] = 0.03700; f[10] = 0.08500; f[11] = 0.08000;
580	f[12] = 0.01500; f[13] = 0.04000; f[14] = 0.05200; f[15] = 0.06900;
581	f[16] = 0.05900; f[17] = 0.01000; f[18] = 0.03000; f[19] = 0.06500;
582
583	}
584	break;
585	case JTT:
586	{
587	daa[ 120+ 0] = 58.00; daa[ 220+ 0] = 54.00; daa[ 220+ 1] = 45.00; daa[ 320+ 0] = 81.00;
588	daa[ 320+ 1] = 16.00; daa[ 320+ 2] = 528.00; daa[ 420+ 0] = 56.00; daa[ 420+ 1] = 113.00;
589	daa[ 420+ 2] = 34.00; daa[ 420+ 3] = 10.00; daa[ 520+ 0] = 57.00; daa[ 520+ 1] = 310.00;
590	daa[ 520+ 2] = 86.00; daa[ 520+ 3] = 49.00; daa[ 520+ 4] = 9.00; daa[ 620+ 0] = 105.00;
591	daa[ 620+ 1] = 29.00; daa[ 620+ 2] = 58.00; daa[ 620+ 3] = 767.00; daa[ 620+ 4] = 5.00;
592	daa[ 620+ 5] = 323.00; daa[ 720+ 0] = 179.00; daa[ 720+ 1] = 137.00; daa[ 720+ 2] = 81.00;
593	daa[ 720+ 3] = 130.00; daa[ 720+ 4] = 59.00; daa[ 720+ 5] = 26.00; daa[ 720+ 6] = 119.00;
594	daa[ 820+ 0] = 27.00; daa[ 820+ 1] = 328.00; daa[ 820+ 2] = 391.00; daa[ 820+ 3] = 112.00;
595	daa[ 820+ 4] = 69.00; daa[ 820+ 5] = 597.00; daa[ 820+ 6] = 26.00; daa[ 820+ 7] = 23.00;
596	daa[ 920+ 0] = 36.00; daa[ 920+ 1] = 22.00; daa[ 920+ 2] = 47.00; daa[ 920+ 3] = 11.00;
597	daa[ 920+ 4] = 17.00; daa[ 920+ 5] = 9.00; daa[ 920+ 6] = 12.00; daa[ 920+ 7] = 6.00;
598	daa[ 920+ 8] = 16.00; daa[1020+ 0] = 30.00; daa[1020+ 1] = 38.00; daa[1020+ 2] = 12.00;
599	daa[1020+ 3] = 7.00; daa[1020+ 4] = 23.00; daa[1020+ 5] = 72.00; daa[1020+ 6] = 9.00;
600	daa[1020+ 7] = 6.00; daa[1020+ 8] = 56.00; daa[1020+ 9] = 229.00; daa[1120+ 0] = 35.00;
601	daa[1120+ 1] = 646.00; daa[1120+ 2] = 263.00; daa[1120+ 3] = 26.00; daa[1120+ 4] = 7.00;
602	daa[1120+ 5] = 292.00; daa[1120+ 6] = 181.00; daa[1120+ 7] = 27.00; daa[1120+ 8] = 45.00;
603	daa[1120+ 9] = 21.00; daa[1120+10] = 14.00; daa[1220+ 0] = 54.00; daa[1220+ 1] = 44.00;
604	daa[1220+ 2] = 30.00; daa[1220+ 3] = 15.00; daa[1220+ 4] = 31.00; daa[1220+ 5] = 43.00;
605	daa[1220+ 6] = 18.00; daa[1220+ 7] = 14.00; daa[1220+ 8] = 33.00; daa[1220+ 9] = 479.00;
606	daa[1220+10] = 388.00; daa[1220+11] = 65.00; daa[1320+ 0] = 15.00; daa[1320+ 1] = 5.00;
607	daa[1320+ 2] = 10.00; daa[1320+ 3] = 4.00; daa[1320+ 4] = 78.00; daa[1320+ 5] = 4.00;
608	daa[1320+ 6] = 5.00; daa[1320+ 7] = 5.00; daa[1320+ 8] = 40.00; daa[1320+ 9] = 89.00;
609	daa[1320+10] = 248.00; daa[1320+11] = 4.00; daa[1320+12] = 43.00; daa[1420+ 0] = 194.00;
610	daa[1420+ 1] = 74.00; daa[1420+ 2] = 15.00; daa[1420+ 3] = 15.00; daa[1420+ 4] = 14.00;
611	daa[1420+ 5] = 164.00; daa[1420+ 6] = 18.00; daa[1420+ 7] = 24.00; daa[1420+ 8] = 115.00;
612	daa[1420+ 9] = 10.00; daa[1420+10] = 102.00; daa[1420+11] = 21.00; daa[1420+12] = 16.00;
613	daa[1420+13] = 17.00; daa[1520+ 0] = 378.00; daa[1520+ 1] = 101.00; daa[1520+ 2] = 503.00;
614	daa[1520+ 3] = 59.00; daa[1520+ 4] = 223.00; daa[1520+ 5] = 53.00; daa[1520+ 6] = 30.00;
615	daa[1520+ 7] = 201.00; daa[1520+ 8] = 73.00; daa[1520+ 9] = 40.00; daa[1520+10] = 59.00;
616	daa[1520+11] = 47.00; daa[1520+12] = 29.00; daa[1520+13] = 92.00; daa[1520+14] = 285.00;
617	daa[1620+ 0] = 475.00; daa[1620+ 1] = 64.00; daa[1620+ 2] = 232.00; daa[1620+ 3] = 38.00;
618	daa[1620+ 4] = 42.00; daa[1620+ 5] = 51.00; daa[1620+ 6] = 32.00; daa[1620+ 7] = 33.00;
619	daa[1620+ 8] = 46.00; daa[1620+ 9] = 245.00; daa[1620+10] = 25.00; daa[1620+11] = 103.00;
620	daa[1620+12] = 226.00; daa[1620+13] = 12.00; daa[1620+14] = 118.00; daa[1620+15] = 477.00;
621	daa[1720+ 0] = 9.00; daa[1720+ 1] = 126.00; daa[1720+ 2] = 8.00; daa[1720+ 3] = 4.00;
622	daa[1720+ 4] = 115.00; daa[1720+ 5] = 18.00; daa[1720+ 6] = 10.00; daa[1720+ 7] = 55.00;
623	daa[1720+ 8] = 8.00; daa[1720+ 9] = 9.00; daa[1720+10] = 52.00; daa[1720+11] = 10.00;
624	daa[1720+12] = 24.00; daa[1720+13] = 53.00; daa[1720+14] = 6.00; daa[1720+15] = 35.00;
625	daa[1720+16] = 12.00; daa[1820+ 0] = 11.00; daa[1820+ 1] = 20.00; daa[1820+ 2] = 70.00;
626	daa[1820+ 3] = 46.00; daa[1820+ 4] = 209.00; daa[1820+ 5] = 24.00; daa[1820+ 6] = 7.00;
627	daa[1820+ 7] = 8.00; daa[1820+ 8] = 573.00; daa[1820+ 9] = 32.00; daa[1820+10] = 24.00;
628	daa[1820+11] = 8.00; daa[1820+12] = 18.00; daa[1820+13] = 536.00; daa[1820+14] = 10.00;
629	daa[1820+15] = 63.00; daa[1820+16] = 21.00; daa[1820+17] = 71.00; daa[1920+ 0] = 298.00;
630	daa[1920+ 1] = 17.00; daa[1920+ 2] = 16.00; daa[1920+ 3] = 31.00; daa[1920+ 4] = 62.00;
631	daa[1920+ 5] = 20.00; daa[1920+ 6] = 45.00; daa[1920+ 7] = 47.00; daa[1920+ 8] = 11.00;
632	daa[1920+ 9] = 961.00; daa[1920+10] = 180.00; daa[1920+11] = 14.00; daa[1920+12] = 323.00;
633	daa[1920+13] = 62.00; daa[1920+14] = 23.00; daa[1920+15] = 38.00; daa[1920+16] = 112.00;
634	daa[1920+17] = 25.00; daa[1920+18] = 16.00;
635
636	f[ 0] = 0.07700; f[ 1] = 0.05200; f[ 2] = 0.04200; f[ 3] = 0.05100;
637	f[ 4] = 0.02000; f[ 5] = 0.04100; f[ 6] = 0.06200; f[ 7] = 0.07300;
638	f[ 8] = 0.02300; f[ 9] = 0.05400; f[10] = 0.09200; f[11] = 0.05900;
639	f[12] = 0.02400; f[13] = 0.04000; f[14] = 0.05100; f[15] = 0.06900;
640	f[16] = 0.05800; f[17] = 0.01400; f[18] = 0.03200; f[19] = 0.06600;
641	}
642	break;
643	case MTREV:
644	{
645	daa[ 120+ 0] = 23.18; daa[ 220+ 0] = 26.95; daa[ 220+ 1] = 13.24; daa[ 320+ 0] = 17.67;
646	daa[ 320+ 1] = 1.90; daa[ 320+ 2] = 794.38; daa[ 420+ 0] = 59.93; daa[ 420+ 1] = 103.33;
647	daa[ 420+ 2] = 58.94; daa[ 420+ 3] = 1.90; daa[ 520+ 0] = 1.90; daa[ 520+ 1] = 220.99;
648	daa[ 520+ 2] = 173.56; daa[ 520+ 3] = 55.28; daa[ 520+ 4] = 75.24; daa[ 620+ 0] = 9.77;
649	daa[ 620+ 1] = 1.90; daa[ 620+ 2] = 63.05; daa[ 620+ 3] = 583.55; daa[ 620+ 4] = 1.90;
650	daa[ 620+ 5] = 313.56; daa[ 720+ 0] = 120.71; daa[ 720+ 1] = 23.03; daa[ 720+ 2] = 53.30;
651	daa[ 720+ 3] = 56.77; daa[ 720+ 4] = 30.71; daa[ 720+ 5] = 6.75; daa[ 720+ 6] = 28.28;
652	daa[ 820+ 0] = 13.90; daa[ 820+ 1] = 165.23; daa[ 820+ 2] = 496.13; daa[ 820+ 3] = 113.99;
653	daa[ 820+ 4] = 141.49; daa[ 820+ 5] = 582.40; daa[ 820+ 6] = 49.12; daa[ 820+ 7] = 1.90;
654	daa[ 920+ 0] = 96.49; daa[ 920+ 1] = 1.90; daa[ 920+ 2] = 27.10; daa[ 920+ 3] = 4.34;
655	daa[ 920+ 4] = 62.73; daa[ 920+ 5] = 8.34; daa[ 920+ 6] = 3.31; daa[ 920+ 7] = 5.98;
656	daa[ 920+ 8] = 12.26; daa[1020+ 0] = 25.46; daa[1020+ 1] = 15.58; daa[1020+ 2] = 15.16;
657	daa[1020+ 3] = 1.90; daa[1020+ 4] = 25.65; daa[1020+ 5] = 39.70; daa[1020+ 6] = 1.90;
658	daa[1020+ 7] = 2.41; daa[1020+ 8] = 11.49; daa[1020+ 9] = 329.09; daa[1120+ 0] = 8.36;
659	daa[1120+ 1] = 141.40; daa[1120+ 2] = 608.70; daa[1120+ 3] = 2.31; daa[1120+ 4] = 1.90;
660	daa[1120+ 5] = 465.58; daa[1120+ 6] = 313.86; daa[1120+ 7] = 22.73; daa[1120+ 8] = 127.67;
661	daa[1120+ 9] = 19.57; daa[1120+10] = 14.88; daa[1220+ 0] = 141.88; daa[1220+ 1] = 1.90;
662	daa[1220+ 2] = 65.41; daa[1220+ 3] = 1.90; daa[1220+ 4] = 6.18; daa[1220+ 5] = 47.37;
663	daa[1220+ 6] = 1.90; daa[1220+ 7] = 1.90; daa[1220+ 8] = 11.97; daa[1220+ 9] = 517.98;
664	daa[1220+10] = 537.53; daa[1220+11] = 91.37; daa[1320+ 0] = 6.37; daa[1320+ 1] = 4.69;
665	daa[1320+ 2] = 15.20; daa[1320+ 3] = 4.98; daa[1320+ 4] = 70.80; daa[1320+ 5] = 19.11;
666	daa[1320+ 6] = 2.67; daa[1320+ 7] = 1.90; daa[1320+ 8] = 48.16; daa[1320+ 9] = 84.67;
667	daa[1320+10] = 216.06; daa[1320+11] = 6.44; daa[1320+12] = 90.82; daa[1420+ 0] = 54.31;
668	daa[1420+ 1] = 23.64; daa[1420+ 2] = 73.31; daa[1420+ 3] = 13.43; daa[1420+ 4] = 31.26;
669	daa[1420+ 5] = 137.29; daa[1420+ 6] = 12.83; daa[1420+ 7] = 1.90; daa[1420+ 8] = 60.97;
670	daa[1420+ 9] = 20.63; daa[1420+10] = 40.10; daa[1420+11] = 50.10; daa[1420+12] = 18.84;
671	daa[1420+13] = 17.31; daa[1520+ 0] = 387.86; daa[1520+ 1] = 6.04; daa[1520+ 2] = 494.39;
672	daa[1520+ 3] = 69.02; daa[1520+ 4] = 277.05; daa[1520+ 5] = 54.11; daa[1520+ 6] = 54.71;
673	daa[1520+ 7] = 125.93; daa[1520+ 8] = 77.46; daa[1520+ 9] = 47.70; daa[1520+10] = 73.61;
674	daa[1520+11] = 105.79; daa[1520+12] = 111.16; daa[1520+13] = 64.29; daa[1520+14] = 169.90;
675	daa[1620+ 0] = 480.72; daa[1620+ 1] = 2.08; daa[1620+ 2] = 238.46; daa[1620+ 3] = 28.01;
676	daa[1620+ 4] = 179.97; daa[1620+ 5] = 94.93; daa[1620+ 6] = 14.82; daa[1620+ 7] = 11.17;
677	daa[1620+ 8] = 44.78; daa[1620+ 9] = 368.43; daa[1620+10] = 126.40; daa[1620+11] = 136.33;
678	daa[1620+12] = 528.17; daa[1620+13] = 33.85; daa[1620+14] = 128.22; daa[1620+15] = 597.21;
679	daa[1720+ 0] = 1.90; daa[1720+ 1] = 21.95; daa[1720+ 2] = 10.68; daa[1720+ 3] = 19.86;
680	daa[1720+ 4] = 33.60; daa[1720+ 5] = 1.90; daa[1720+ 6] = 1.90; daa[1720+ 7] = 10.92;
681	daa[1720+ 8] = 7.08; daa[1720+ 9] = 1.90; daa[1720+10] = 32.44; daa[1720+11] = 24.00;
682	daa[1720+12] = 21.71; daa[1720+13] = 7.84; daa[1720+14] = 4.21; daa[1720+15] = 38.58;
683	daa[1720+16] = 9.99; daa[1820+ 0] = 6.48; daa[1820+ 1] = 1.90; daa[1820+ 2] = 191.36;
684	daa[1820+ 3] = 21.21; daa[1820+ 4] = 254.77; daa[1820+ 5] = 38.82; daa[1820+ 6] = 13.12;
685	daa[1820+ 7] = 3.21; daa[1820+ 8] = 670.14; daa[1820+ 9] = 25.01; daa[1820+10] = 44.15;
686	daa[1820+11] = 51.17; daa[1820+12] = 39.96; daa[1820+13] = 465.58; daa[1820+14] = 16.21;
687	daa[1820+15] = 64.92; daa[1820+16] = 38.73; daa[1820+17] = 26.25; daa[1920+ 0] = 195.06;
688	daa[1920+ 1] = 7.64; daa[1920+ 2] = 1.90; daa[1920+ 3] = 1.90; daa[1920+ 4] = 1.90;
689	daa[1920+ 5] = 19.00; daa[1920+ 6] = 21.14; daa[1920+ 7] = 2.53; daa[1920+ 8] = 1.90;
690	daa[1920+ 9] = 1222.94; daa[1920+10] = 91.67; daa[1920+11] = 1.90; daa[1920+12] = 387.54;
691	daa[1920+13] = 6.35; daa[1920+14] = 8.23; daa[1920+15] = 1.90; daa[1920+16] = 204.54;
692	daa[1920+17] = 5.37; daa[1920+18] = 1.90;
693
694
695	f[ 0] = 0.072000; f[ 1] = 0.019000; f[ 2] = 0.039000; f[ 3] = 0.019000;
696	f[ 4] = 0.006000; f[ 5] = 0.025000; f[ 6] = 0.024000; f[ 7] = 0.056000;
697	f[ 8] = 0.028000; f[ 9] = 0.088000; f[10] = 0.169000; f[11] = 0.023000;
698	f[12] = 0.054000; f[13] = 0.061000; f[14] = 0.054000; f[15] = 0.072000;
699	f[16] = 0.086000; f[17] = 0.029000; f[18] = 0.033000; f[19] = 0.043000;
700	}
701	break;
702	case WAG:
703	{
704	daa[ 120+ 0] = 55.15710; daa[ 220+ 0] = 50.98480; daa[ 2*20+ 1] = 63.53460;
705	daa[ 320+ 0] = 73.89980; daa[ 320+ 1] = 14.73040; daa[ 3*20+ 2] = 542.94200;
706	daa[ 420+ 0] = 102.70400; daa[ 420+ 1] = 52.81910; daa[ 4*20+ 2] = 26.52560;
707	daa[ 420+ 3] = 3.02949; daa[ 520+ 0] = 90.85980; daa[ 5*20+ 1] = 303.55000;
708	daa[ 520+ 2] = 154.36400; daa[ 520+ 3] = 61.67830; daa[ 5*20+ 4] = 9.88179;
709	daa[ 620+ 0] = 158.28500; daa[ 620+ 1] = 43.91570; daa[ 6*20+ 2] = 94.71980;
710	daa[ 620+ 3] = 617.41600; daa[ 620+ 4] = 2.13520; daa[ 6*20+ 5] = 546.94700;
711	daa[ 720+ 0] = 141.67200; daa[ 720+ 1] = 58.46650; daa[ 7*20+ 2] = 112.55600;
712	daa[ 720+ 3] = 86.55840; daa[ 720+ 4] = 30.66740; daa[ 7*20+ 5] = 33.00520;
713	daa[ 720+ 6] = 56.77170; daa[ 820+ 0] = 31.69540; daa[ 8*20+ 1] = 213.71500;
714	daa[ 820+ 2] = 395.62900; daa[ 820+ 3] = 93.06760; daa[ 8*20+ 4] = 24.89720;
715	daa[ 820+ 5] = 429.41100; daa[ 820+ 6] = 57.00250; daa[ 8*20+ 7] = 24.94100;
716	daa[ 920+ 0] = 19.33350; daa[ 920+ 1] = 18.69790; daa[ 9*20+ 2] = 55.42360;
717	daa[ 920+ 3] = 3.94370; daa[ 920+ 4] = 17.01350; daa[ 9*20+ 5] = 11.39170;
718	daa[ 920+ 6] = 12.73950; daa[ 920+ 7] = 3.04501; daa[ 9*20+ 8] = 13.81900;
719	daa[1020+ 0] = 39.79150; daa[1020+ 1] = 49.76710; daa[10*20+ 2] = 13.15280;
720	daa[1020+ 3] = 8.48047; daa[1020+ 4] = 38.42870; daa[10*20+ 5] = 86.94890;
721	daa[1020+ 6] = 15.42630; daa[1020+ 7] = 6.13037; daa[10*20+ 8] = 49.94620;
722	daa[1020+ 9] = 317.09700; daa[1120+ 0] = 90.62650; daa[11*20+ 1] = 535.14200;
723	daa[1120+ 2] = 301.20100; daa[1120+ 3] = 47.98550; daa[11*20+ 4] = 7.40339;
724	daa[1120+ 5] = 389.49000; daa[1120+ 6] = 258.44300; daa[11*20+ 7] = 37.35580;
725	daa[1120+ 8] = 89.04320; daa[1120+ 9] = 32.38320; daa[11*20+10] = 25.75550;
726	daa[1220+ 0] = 89.34960; daa[1220+ 1] = 68.31620; daa[12*20+ 2] = 19.82210;
727	daa[1220+ 3] = 10.37540; daa[1220+ 4] = 39.04820; daa[12*20+ 5] = 154.52600;
728	daa[1220+ 6] = 31.51240; daa[1220+ 7] = 17.41000; daa[12*20+ 8] = 40.41410;
729	daa[1220+ 9] = 425.74600; daa[1220+10] = 485.40200; daa[12*20+11] = 93.42760;
730	daa[1320+ 0] = 21.04940; daa[1320+ 1] = 10.27110; daa[13*20+ 2] = 9.61621;
731	daa[1320+ 3] = 4.67304; daa[1320+ 4] = 39.80200; daa[13*20+ 5] = 9.99208;
732	daa[1320+ 6] = 8.11339; daa[1320+ 7] = 4.99310; daa[13*20+ 8] = 67.93710;
733	daa[1320+ 9] = 105.94700; daa[1320+10] = 211.51700; daa[13*20+11] = 8.88360;
734	daa[1320+12] = 119.06300; daa[1420+ 0] = 143.85500; daa[14*20+ 1] = 67.94890;
735	daa[1420+ 2] = 19.50810; daa[1420+ 3] = 42.39840; daa[14*20+ 4] = 10.94040;
736	daa[1420+ 5] = 93.33720; daa[1420+ 6] = 68.23550; daa[14*20+ 7] = 24.35700;
737	daa[1420+ 8] = 69.61980; daa[1420+ 9] = 9.99288; daa[14*20+10] = 41.58440;
738	daa[1420+11] = 55.68960; daa[1420+12] = 17.13290; daa[14*20+13] = 16.14440;
739	daa[1520+ 0] = 337.07900; daa[1520+ 1] = 122.41900; daa[15*20+ 2] = 397.42300;
740	daa[1520+ 3] = 107.17600; daa[1520+ 4] = 140.76600; daa[15*20+ 5] = 102.88700;
741	daa[1520+ 6] = 70.49390; daa[1520+ 7] = 134.18200; daa[15*20+ 8] = 74.01690;
742	daa[1520+ 9] = 31.94400; daa[1520+10] = 34.47390; daa[15*20+11] = 96.71300;
743	daa[1520+12] = 49.39050; daa[1520+13] = 54.59310; daa[15*20+14] = 161.32800;
744	daa[1620+ 0] = 212.11100; daa[1620+ 1] = 55.44130; daa[16*20+ 2] = 203.00600;
745	daa[1620+ 3] = 37.48660; daa[1620+ 4] = 51.29840; daa[16*20+ 5] = 85.79280;
746	daa[1620+ 6] = 82.27650; daa[1620+ 7] = 22.58330; daa[16*20+ 8] = 47.33070;
747	daa[1620+ 9] = 145.81600; daa[1620+10] = 32.66220; daa[16*20+11] = 138.69800;
748	daa[1620+12] = 151.61200; daa[1620+13] = 17.19030; daa[16*20+14] = 79.53840;
749	daa[1620+15] = 437.80200; daa[1720+ 0] = 11.31330; daa[17*20+ 1] = 116.39200;
750	daa[1720+ 2] = 7.19167; daa[1720+ 3] = 12.97670; daa[17*20+ 4] = 71.70700;
751	daa[1720+ 5] = 21.57370; daa[1720+ 6] = 15.65570; daa[17*20+ 7] = 33.69830;
752	daa[1720+ 8] = 26.25690; daa[1720+ 9] = 21.24830; daa[17*20+10] = 66.53090;
753	daa[1720+11] = 13.75050; daa[1720+12] = 51.57060; daa[17*20+13] = 152.96400;
754	daa[1720+14] = 13.94050; daa[1720+15] = 52.37420; daa[17*20+16] = 11.08640;
755	daa[1820+ 0] = 24.07350; daa[1820+ 1] = 38.15330; daa[18*20+ 2] = 108.60000;
756	daa[1820+ 3] = 32.57110; daa[1820+ 4] = 54.38330; daa[18*20+ 5] = 22.77100;
757	daa[1820+ 6] = 19.63030; daa[1820+ 7] = 10.36040; daa[18*20+ 8] = 387.34400;
758	daa[1820+ 9] = 42.01700; daa[1820+10] = 39.86180; daa[18*20+11] = 13.32640;
759	daa[1820+12] = 42.84370; daa[1820+13] = 645.42800; daa[18*20+14] = 21.60460;
760	daa[1820+15] = 78.69930; daa[1820+16] = 29.11480; daa[18*20+17] = 248.53900;
761	daa[1920+ 0] = 200.60100; daa[1920+ 1] = 25.18490; daa[19*20+ 2] = 19.62460;
762	daa[1920+ 3] = 15.23350; daa[1920+ 4] = 100.21400; daa[19*20+ 5] = 30.12810;
763	daa[1920+ 6] = 58.87310; daa[1920+ 7] = 18.72470; daa[19*20+ 8] = 11.83580;
764	daa[1920+ 9] = 782.13000; daa[1920+10] = 180.03400; daa[19*20+11] = 30.54340;
765	daa[1920+12] = 205.84500; daa[1920+13] = 64.98920; daa[19*20+14] = 31.48870;
766	daa[1920+15] = 23.27390; daa[1920+16] = 138.82300; daa[19*20+17] = 36.53690;
767	daa[19*20+18] = 31.47300;
768
769	f[0] = 0.08700; f[1] = 0.04400; f[2] = 0.03900; f[3] = 0.05700;
770	f[4] = 0.01900; f[5] = 0.03700; f[6] = 0.05800; f[7] = 0.08300;
771	f[8] = 0.02400; f[9] = 0.04900; f[10] = 0.08600; f[11] = 0.06200;
772	f[12] = 0.02000; f[13] = 0.03800; f[14] = 0.04600; f[15] = 0.07000;
773	f[16] = 0.06100; f[17] = 0.01400; f[18] = 0.03500; f[19] = 0.07100;
774	}
775	break;
776	case RTREV:
777	{
778	daa[120+0]= 34; daa[220+0]= 51; daa[220+1]= 35; daa[320+0]= 10;
779	daa[320+1]= 30; daa[320+2]= 384; daa[420+0]= 439; daa[420+1]= 92;
780	daa[420+2]= 128; daa[420+3]= 1; daa[520+0]= 32; daa[520+1]= 221;
781	daa[520+2]= 236; daa[520+3]= 78; daa[520+4]= 70; daa[620+0]= 81;
782	daa[620+1]= 10; daa[620+2]= 79; daa[620+3]= 542; daa[620+4]= 1;
783	daa[620+5]= 372; daa[720+0]= 135; daa[720+1]= 41; daa[720+2]= 94;
784	daa[720+3]= 61; daa[720+4]= 48; daa[720+5]= 18; daa[720+6]= 70;
785	daa[820+0]= 30; daa[820+1]= 90; daa[820+2]= 320; daa[820+3]= 91;
786	daa[820+4]= 124; daa[820+5]= 387; daa[820+6]= 34; daa[820+7]= 68;
787	daa[920+0]= 1; daa[920+1]= 24; daa[920+2]= 35; daa[920+3]= 1;
788	daa[920+4]= 104; daa[920+5]= 33; daa[920+6]= 1; daa[920+7]= 1;
789	daa[920+8]= 34; daa[1020+0]= 45; daa[1020+1]= 18; daa[1020+2]= 15;
790	daa[1020+3]= 5; daa[1020+4]= 110; daa[1020+5]= 54; daa[1020+6]= 21;
791	daa[1020+7]= 3; daa[1020+8]= 51; daa[1020+9]= 385; daa[1120+0]= 38;
792	daa[1120+1]= 593; daa[1120+2]= 123; daa[1120+3]= 20; daa[1120+4]= 16;
793	daa[1120+5]= 309; daa[1120+6]= 141; daa[1120+7]= 30; daa[1120+8]= 76;
794	daa[1120+9]= 34; daa[1120+10]= 23; daa[1220+0]= 235; daa[1220+1]= 57;
795	daa[1220+2]= 1; daa[1220+3]= 1; daa[1220+4]= 156; daa[1220+5]= 158;
796	daa[1220+6]= 1; daa[1220+7]= 37; daa[1220+8]= 116; daa[1220+9]= 375;
797	daa[1220+10]= 581; daa[1220+11]= 134; daa[1320+0]= 1; daa[1320+1]= 7;
798	daa[1320+2]= 49; daa[1320+3]= 1; daa[1320+4]= 70; daa[1320+5]= 1;
799	daa[1320+6]= 1; daa[1320+7]= 7; daa[1320+8]= 141; daa[1320+9]= 64;
800	daa[1320+10]= 179; daa[1320+11]= 14; daa[1320+12]= 247; daa[1420+0]= 97;
801	daa[1420+1]= 24; daa[1420+2]= 33; daa[1420+3]= 55; daa[1420+4]= 1;
802	daa[1420+5]= 68; daa[1420+6]= 52; daa[1420+7]= 17; daa[1420+8]= 44;
803	daa[1420+9]= 10; daa[1420+10]= 22; daa[1420+11]= 43; daa[1420+12]= 1;
804	daa[1420+13]= 11; daa[1520+0]= 460; daa[1520+1]= 102; daa[1520+2]= 294;
805	daa[1520+3]= 136; daa[1520+4]= 75; daa[1520+5]= 225; daa[1520+6]= 95;
806	daa[1520+7]= 152; daa[1520+8]= 183; daa[1520+9]= 4; daa[1520+10]= 24;
807	daa[1520+11]= 77; daa[1520+12]= 1; daa[1520+13]= 20; daa[1520+14]= 134;
808	daa[1620+0]= 258; daa[1620+1]= 64; daa[1620+2]= 148; daa[1620+3]= 55;
809	daa[1620+4]= 117; daa[1620+5]= 146; daa[1620+6]= 82; daa[1620+7]= 7;
810	daa[1620+8]= 49; daa[1620+9]= 72; daa[1620+10]= 25; daa[1620+11]= 110;
811	daa[1620+12]= 131; daa[1620+13]= 69; daa[1620+14]= 62; daa[1620+15]= 671;
812	daa[1720+0]= 5; daa[1720+1]= 13; daa[1720+2]= 16; daa[1720+3]= 1;
813	daa[1720+4]= 55; daa[1720+5]= 10; daa[1720+6]= 17; daa[1720+7]= 23;
814	daa[1720+8]= 48; daa[1720+9]= 39; daa[1720+10]= 47; daa[1720+11]= 6;
815	daa[1720+12]= 111; daa[1720+13]= 182; daa[1720+14]= 9; daa[1720+15]= 14;
816	daa[1720+16]= 1; daa[1820+0]= 55; daa[1820+1]= 47; daa[1820+2]= 28;
817	daa[1820+3]= 1; daa[1820+4]= 131; daa[1820+5]= 45; daa[1820+6]= 1;
818	daa[1820+7]= 21; daa[1820+8]= 307; daa[1820+9]= 26; daa[1820+10]= 64;
819	daa[1820+11]= 1; daa[1820+12]= 74; daa[1820+13]= 1017; daa[1820+14]= 14;
820	daa[1820+15]= 31; daa[1820+16]= 34; daa[1820+17]= 176; daa[1920+0]= 197;
821	daa[1920+1]= 29; daa[1920+2]= 21; daa[1920+3]= 6; daa[1920+4]= 295;
822	daa[1920+5]= 36; daa[1920+6]= 35; daa[1920+7]= 3; daa[1920+8]= 1;
823	daa[1920+9]= 1048; daa[1920+10]= 112; daa[1920+11]= 19; daa[1920+12]= 236;
824	daa[1920+13]= 92; daa[1920+14]= 25; daa[1920+15]= 39; daa[1920+16]= 196;
825	daa[1920+17]= 26; daa[1920+18]= 59;
826
827	f[0]= 0.0646; f[1]= 0.0453; f[2]= 0.0376; f[3]= 0.0422;
828	f[4]= 0.0114; f[5]= 0.0606; f[6]= 0.0607; f[7]= 0.0639;
829	f[8]= 0.0273; f[9]= 0.0679; f[10]= 0.1018; f[11]= 0.0751;
830	f[12]= 0.015; f[13]= 0.0287; f[14]= 0.0681; f[15]= 0.0488;
831	f[16]= 0.0622; f[17]= 0.0251; f[18]= 0.0318; f[19]= 0.0619;
832	}
833	break;
834	case CPREV:
835	{
836	daa[120+0]= 105; daa[220+0]= 227; daa[220+1]= 357; daa[320+0]= 175;
837	daa[320+1]= 43; daa[320+2]= 4435; daa[420+0]= 669; daa[420+1]= 823;
838	daa[420+2]= 538; daa[420+3]= 10; daa[520+0]= 157; daa[520+1]= 1745;
839	daa[520+2]= 768; daa[520+3]= 400; daa[520+4]= 10; daa[620+0]= 499;
840	daa[620+1]= 152; daa[620+2]= 1055; daa[620+3]= 3691; daa[620+4]= 10;
841	daa[620+5]= 3122; daa[720+0]= 665; daa[720+1]= 243; daa[720+2]= 653;
842	daa[720+3]= 431; daa[720+4]= 303; daa[720+5]= 133; daa[720+6]= 379;
843	daa[820+0]= 66; daa[820+1]= 715; daa[820+2]= 1405; daa[820+3]= 331;
844	daa[820+4]= 441; daa[820+5]= 1269; daa[820+6]= 162; daa[820+7]= 19;
845	daa[920+0]= 145; daa[920+1]= 136; daa[920+2]= 168; daa[920+3]= 10;
846	daa[920+4]= 280; daa[920+5]= 92; daa[920+6]= 148; daa[920+7]= 40;
847	daa[920+8]= 29; daa[1020+0]= 197; daa[1020+1]= 203; daa[1020+2]= 113;
848	daa[1020+3]= 10; daa[1020+4]= 396; daa[1020+5]= 286; daa[1020+6]= 82;
849	daa[1020+7]= 20; daa[1020+8]= 66; daa[1020+9]= 1745; daa[1120+0]= 236;
850	daa[1120+1]= 4482; daa[1120+2]= 2430; daa[1120+3]= 412; daa[1120+4]= 48;
851	daa[1120+5]= 3313; daa[1120+6]= 2629; daa[1120+7]= 263; daa[1120+8]= 305;
852	daa[1120+9]= 345; daa[1120+10]= 218; daa[1220+0]= 185; daa[1220+1]= 125;
853	daa[1220+2]= 61; daa[1220+3]= 47; daa[1220+4]= 159; daa[1220+5]= 202;
854	daa[1220+6]= 113; daa[1220+7]= 21; daa[1220+8]= 10; daa[1220+9]= 1772;
855	daa[1220+10]= 1351; daa[1220+11]= 193; daa[1320+0]= 68; daa[1320+1]= 53;
856	daa[1320+2]= 97; daa[1320+3]= 22; daa[1320+4]= 726; daa[1320+5]= 10;
857	daa[1320+6]= 145; daa[1320+7]= 25; daa[1320+8]= 127; daa[1320+9]= 454;
858	daa[1320+10]= 1268; daa[1320+11]= 72; daa[1320+12]= 327; daa[1420+0]= 490;
859	daa[1420+1]= 87; daa[1420+2]= 173; daa[1420+3]= 170; daa[1420+4]= 285;
860	daa[1420+5]= 323; daa[1420+6]= 185; daa[1420+7]= 28; daa[1420+8]= 152;
861	daa[1420+9]= 117; daa[1420+10]= 219; daa[1420+11]= 302; daa[1420+12]= 100;
862	daa[1420+13]= 43; daa[1520+0]= 2440; daa[1520+1]= 385; daa[1520+2]= 2085;
863	daa[1520+3]= 590; daa[1520+4]= 2331; daa[1520+5]= 396; daa[1520+6]= 568;
864	daa[1520+7]= 691; daa[1520+8]= 303; daa[1520+9]= 216; daa[1520+10]= 516;
865	daa[1520+11]= 868; daa[1520+12]= 93; daa[1520+13]= 487; daa[1520+14]= 1202;
866	daa[1620+0]= 1340; daa[1620+1]= 314; daa[1620+2]= 1393; daa[1620+3]= 266;
867	daa[1620+4]= 576; daa[1620+5]= 241; daa[1620+6]= 369; daa[1620+7]= 92;
868	daa[1620+8]= 32; daa[1620+9]= 1040; daa[1620+10]= 156; daa[1620+11]= 918;
869	daa[1620+12]= 645; daa[1620+13]= 148; daa[1620+14]= 260; daa[1620+15]= 2151;
870	daa[1720+0]= 14; daa[1720+1]= 230; daa[1720+2]= 40; daa[1720+3]= 18;
871	daa[1720+4]= 435; daa[1720+5]= 53; daa[1720+6]= 63; daa[1720+7]= 82;
872	daa[1720+8]= 69; daa[1720+9]= 42; daa[1720+10]= 159; daa[1720+11]= 10;
873	daa[1720+12]= 86; daa[1720+13]= 468; daa[1720+14]= 49; daa[1720+15]= 73;
874	daa[1720+16]= 29; daa[1820+0]= 56; daa[1820+1]= 323; daa[1820+2]= 754;
875	daa[1820+3]= 281; daa[1820+4]= 1466; daa[1820+5]= 391; daa[1820+6]= 142;
876	daa[1820+7]= 10; daa[1820+8]= 1971; daa[1820+9]= 89; daa[1820+10]= 189;
877	daa[1820+11]= 247; daa[1820+12]= 215; daa[1820+13]= 2370; daa[1820+14]= 97;
878	daa[1820+15]= 522; daa[1820+16]= 71; daa[1820+17]= 346; daa[1920+0]= 968;
879	daa[1920+1]= 92; daa[1920+2]= 83; daa[1920+3]= 75; daa[1920+4]= 592;
880	daa[1920+5]= 54; daa[1920+6]= 200; daa[1920+7]= 91; daa[1920+8]= 25;
881	daa[1920+9]= 4797; daa[1920+10]= 865; daa[1920+11]= 249; daa[1920+12]= 475;
882	daa[1920+13]= 317; daa[1920+14]= 122; daa[1920+15]= 167; daa[1920+16]= 760;
883	daa[1920+17]= 10; daa[1920+18]= 119;
884
885	f[0]= 0.076; f[1]= 0.062; f[2]= 0.041; f[3]= 0.037;
886	f[4]= 0.009; f[5]= 0.038; f[6]= 0.049; f[7]= 0.084;
887	f[8]= 0.025; f[9]= 0.081; f[10]= 0.101; f[11]= 0.05;
888	f[12]= 0.022; f[13]= 0.051; f[14]= 0.043; f[15]= 0.062;
889	f[16]= 0.054; f[17]= 0.018; f[18]= 0.031; f[19]= 0.066;
890	}
891	break;
892	case VT:
893	{
894	/*
895	daa[120+0]= 0.233108; daa[220+0]= 0.199097; daa[220+1]= 0.210797; daa[320+0]= 0.265145;
896	daa[320+1]= 0.105191; daa[320+2]= 0.883422; daa[420+0]= 0.227333; daa[420+1]= 0.031726;
897	daa[420+2]= 0.027495; daa[420+3]= 0.010313; daa[520+0]= 0.310084; daa[520+1]= 0.493763;
898	daa[520+2]= 0.2757; daa[520+3]= 0.205842; daa[520+4]= 0.004315; daa[620+0]= 0.567957;
899	daa[620+1]= 0.25524; daa[620+2]= 0.270417; daa[620+3]= 1.599461; daa[620+4]= 0.005321;
900	daa[620+5]= 0.960976; daa[720+0]= 0.876213; daa[720+1]= 0.156945; daa[720+2]= 0.362028;
901	daa[720+3]= 0.311718; daa[720+4]= 0.050876; daa[720+5]= 0.12866; daa[720+6]= 0.250447;
902	daa[820+0]= 0.078692; daa[820+1]= 0.213164; daa[820+2]= 0.290006; daa[820+3]= 0.134252;
903	daa[820+4]= 0.016695; daa[820+5]= 0.315521; daa[820+6]= 0.104458; daa[820+7]= 0.058131;
904	daa[920+0]= 0.222972; daa[920+1]= 0.08151; daa[920+2]= 0.087225; daa[920+3]= 0.01172;
905	daa[920+4]= 0.046398; daa[920+5]= 0.054602; daa[920+6]= 0.046589; daa[920+7]= 0.051089;
906	daa[920+8]= 0.020039; daa[1020+0]= 0.42463; daa[1020+1]= 0.192364; daa[1020+2]= 0.069245;
907	daa[1020+3]= 0.060863; daa[1020+4]= 0.091709; daa[1020+5]= 0.24353; daa[1020+6]= 0.151924;
908	daa[1020+7]= 0.087056; daa[1020+8]= 0.103552; daa[1020+9]= 2.08989; daa[1120+0]= 0.393245;
909	daa[1120+1]= 1.755838; daa[1120+2]= 0.50306; daa[1120+3]= 0.261101; daa[1120+4]= 0.004067;
910	daa[1120+5]= 0.738208; daa[1120+6]= 0.88863; daa[1120+7]= 0.193243; daa[1120+8]= 0.153323;
911	daa[1120+9]= 0.093181; daa[1120+10]= 0.201204; daa[1220+0]= 0.21155; daa[1220+1]= 0.08793;
912	daa[1220+2]= 0.05742; daa[1220+3]= 0.012182; daa[1220+4]= 0.02369; daa[1220+5]= 0.120801;
913	daa[1220+6]= 0.058643; daa[1220+7]= 0.04656; daa[1220+8]= 0.021157; daa[1220+9]= 0.493845;
914	daa[1220+10]= 1.105667; daa[1220+11]= 0.096474; daa[1320+0]= 0.116646; daa[1320+1]= 0.042569;
915	daa[1320+2]= 0.039769; daa[1320+3]= 0.016577; daa[1320+4]= 0.051127; daa[1320+5]= 0.026235;
916	daa[1320+6]= 0.028168; daa[1320+7]= 0.050143; daa[1320+8]= 0.079807; daa[1320+9]= 0.32102;
917	daa[1320+10]= 0.946499; daa[1320+11]= 0.038261; daa[1320+12]= 0.173052; daa[1420+0]= 0.399143;
918	daa[1420+1]= 0.12848; daa[1420+2]= 0.083956; daa[1420+3]= 0.160063; daa[1420+4]= 0.011137;
919	daa[1420+5]= 0.15657; daa[1420+6]= 0.205134; daa[1420+7]= 0.124492; daa[1420+8]= 0.078892;
920	daa[1420+9]= 0.054797; daa[1420+10]= 0.169784; daa[1420+11]= 0.212302; daa[1420+12]= 0.010363;
921	daa[1420+13]= 0.042564; daa[1520+0]= 1.817198; daa[1520+1]= 0.292327; daa[1520+2]= 0.847049;
922	daa[1520+3]= 0.461519; daa[1520+4]= 0.17527; daa[1520+5]= 0.358017; daa[1520+6]= 0.406035;
923	daa[1520+7]= 0.612843; daa[1520+8]= 0.167406; daa[1520+9]= 0.081567; daa[1520+10]= 0.214977;
924	daa[1520+11]= 0.400072; daa[1520+12]= 0.090515; daa[1520+13]= 0.138119; daa[1520+14]= 0.430431;
925	daa[1620+0]= 0.877877; daa[1620+1]= 0.204109; daa[1620+2]= 0.471268; daa[1620+3]= 0.178197;
926	daa[1620+4]= 0.079511; daa[1620+5]= 0.248992; daa[1620+6]= 0.321028; daa[1620+7]= 0.136266;
927	daa[1620+8]= 0.101117; daa[1620+9]= 0.376588; daa[1620+10]= 0.243227; daa[1620+11]= 0.446646;
928	daa[1620+12]= 0.184609; daa[1620+13]= 0.08587; daa[1620+14]= 0.207143; daa[1620+15]= 1.767766;
929	daa[1720+0]= 0.030309; daa[1720+1]= 0.046417; daa[1720+2]= 0.010459; daa[1720+3]= 0.011393;
930	daa[1720+4]= 0.007732; daa[1720+5]= 0.021248; daa[1720+6]= 0.018844; daa[1720+7]= 0.02399;
931	daa[1720+8]= 0.020009; daa[1720+9]= 0.034954; daa[1720+10]= 0.083439; daa[1720+11]= 0.023321;
932	daa[1720+12]= 0.022019; daa[1720+13]= 0.12805; daa[1720+14]= 0.014584; daa[1720+15]= 0.035933;
933	daa[1720+16]= 0.020437; daa[1820+0]= 0.087061; daa[1820+1]= 0.09701; daa[1820+2]= 0.093268;
934	daa[1820+3]= 0.051664; daa[1820+4]= 0.042823; daa[1820+5]= 0.062544; daa[1820+6]= 0.0552;
935	daa[1820+7]= 0.037568; daa[1820+8]= 0.286027; daa[1820+9]= 0.086237; daa[1820+10]= 0.189842;
936	daa[1820+11]= 0.068689; daa[1820+12]= 0.073223; daa[1820+13]= 0.898663; daa[1820+14]= 0.032043;
937	daa[1820+15]= 0.121979; daa[1820+16]= 0.094617; daa[1820+17]= 0.124746; daa[1920+0]= 1.230985;
938	daa[1920+1]= 0.113146; daa[1920+2]= 0.049824; daa[1920+3]= 0.048769; daa[1920+4]= 0.163831;
939	daa[1920+5]= 0.112027; daa[1920+6]= 0.205868; daa[1920+7]= 0.082579; daa[1920+8]= 0.068575;
940	daa[1920+9]= 3.65443; daa[1920+10]= 1.337571; daa[1920+11]= 0.144587; daa[1920+12]= 0.307309;
941	daa[1920+13]= 0.247329; daa[1920+14]= 0.129315; daa[1920+15]= 0.1277; daa[1920+16]= 0.740372;
942	daa[1920+17]= 0.022134; daa[1920+18]= 0.125733;
943
944	f[0] = 0.07900; f[1]= 0.05100; f[2] = 0.04200; f[3]= 0.05300;
945	f[4] = 0.01500; f[5]= 0.03700; f[6] = 0.06200; f[7]= 0.07100;
946	f[8] = 0.02300; f[9]= 0.06200; f[10] = 0.09600; f[11]= 0.05700;
947	f[12] = 0.02400; f[13]= 0.04300; f[14] = 0.04400; f[15]= 0.06400;
948	f[16] = 0.05600; f[17]= 0.01300; f[18] = 0.03500; f[19]= 0.07300;
949	*/
950
951	daa[1*20+0]= 1.2412691067876198;
952	daa[2*20+0]= 1.2184237953498958;
953	daa[2*20+1]= 1.5720770753326880;
954	daa[3*20+0]= 1.3759368509441177;
955	daa[3*20+1]= 0.7550654439001206;
956	daa[3*20+2]= 7.8584219153689405;
957	daa[4*20+0]= 2.4731223087544874;
958	daa[4*20+1]= 1.4414262567428417;
959	daa[4*20+2]= 0.9784679122774127;
960	daa[4*20+3]= 0.2272488448121475;
961	daa[5*20+0]= 2.2155167805137470;
962	daa[5*20+1]= 5.5120819705248678;
963	daa[5*20+2]= 3.0143201670924822;
964	daa[5*20+3]= 1.6562495638176040;
965	daa[5*20+4]= 0.4587469126746136;
966	daa[6*20+0]= 2.3379911207495061;
967	daa[6*20+1]= 1.3542404860613146;
968	daa[6*20+2]= 2.0093434778398112;
969	daa[6*20+3]= 9.6883451875685065;
970	daa[6*20+4]= 0.4519167943192672;
971	daa[6*20+5]= 6.8124601839937675;
972	daa[7*20+0]= 3.3386555146457697;
973	daa[7*20+1]= 1.3121700301622004;
974	daa[7*20+2]= 2.4117632898861809;
975	daa[7*20+3]= 1.9142079025990228;
976	daa[7*20+4]= 1.1034605684472507;
977	daa[7*20+5]= 0.8776110594765502;
978	daa[7*20+6]= 1.3860121390169038;
979	daa[8*20+0]= 0.9615841926910841;
980	daa[8*20+1]= 4.9238668283945266;
981	daa[8*20+2]= 6.1974384977884114;
982	daa[8*20+3]= 2.1459640610133781;
983	daa[8*20+4]= 1.5196756759380692;
984	daa[8*20+5]= 7.9943228564946525;
985	daa[8*20+6]= 1.6360079688522375;
986	daa[8*20+7]= 0.8561248973045037;
987	daa[9*20+0]= 0.8908203061925510;
988	daa[9*20+1]= 0.4323005487925516;
989	daa[9*20+2]= 0.9179291175331520;
990	daa[9*20+3]= 0.2161660372725585;
991	daa[9*20+4]= 0.9126668032539315;
992	daa[9*20+5]= 0.4882733432879921;
993	daa[9*20+6]= 0.4035497929633328;
994	daa[9*20+7]= 0.2888075033037488;
995	daa[9*20+8]= 0.5787937115407940;
996	daa[10*20+0]= 1.0778497408764076;
997	daa[10*20+1]= 0.8386701149158265;
998	daa[10*20+2]= 0.4098311270816011;
999	daa[10*20+3]= 0.3574207468998517;
1000	daa[10*20+4]= 1.4081315998413697;
1001	daa[10*20+5]= 1.3318097154194044;
1002	daa[10*20+6]= 0.5610717242294755;
1003	daa[10*20+7]= 0.3578662395745526;
1004	daa[10*20+8]= 1.0765007949562073;
1005	daa[10*20+9]= 6.0019110258426362;
1006	daa[11*20+0]= 1.4932055816372476;
1007	daa[11*20+1]= 10.017330817366002;
1008	daa[11*20+2]= 4.4034547578962568;
1009	daa[11*20+3]= 1.4521790561663968;
1010	daa[11*20+4]= 0.3371091785647479;
1011	daa[11*20+5]= 6.0519085243118811;
1012	daa[11*20+6]= 4.3290086529582830;
1013	daa[11*20+7]= 0.8945563662345198;
1014	daa[11*20+8]= 1.8085136096039203;
1015	daa[11*20+9]= 0.6244297525127139;
1016	daa[11*20+10]= 0.5642322882556321;
1017	daa[12*20+0]= 1.9006455961717605;
1018	daa[12*20+1]= 1.2488638689609959;
1019	daa[12*20+2]= 0.9378803706165143;
1020	daa[12*20+3]= 0.4075239926000898;
1021	daa[12*20+4]= 1.2213054800811556;
1022	daa[12*20+5]= 1.9106190827629084;
1023	daa[12*20+6]= 0.7471936218068498;
1024	daa[12*20+7]= 0.5954812791740037;
1025	daa[12*20+8]= 1.3808291710019667;
1026	daa[12*20+9]= 6.7597899772045418;
1027	daa[12*20+10]= 8.0327792947421148;
1028	daa[12*20+11]= 1.7129670976916258;
1029	daa[13*20+0]= 0.6883439026872615;
1030	daa[13*20+1]= 0.4224945197276290;
1031	daa[13*20+2]= 0.5044944273324311;
1032	daa[13*20+3]= 0.1675129724559251;
1033	daa[13*20+4]= 1.6953951980808002;
1034	daa[13*20+5]= 0.3573432522499545;
1035	daa[13*20+6]= 0.2317194387691585;
1036	daa[13*20+7]= 0.3693722640980460;
1037	daa[13*20+8]= 1.3629765501081097;
1038	daa[13*20+9]= 2.2864286949316077;
1039	daa[13*20+10]= 4.3611548063555778;
1040	daa[13*20+11]= 0.3910559903834828;
1041	daa[13*20+12]= 2.3201373546296349;
1042	daa[14*20+0]= 2.7355620089953550;
1043	daa[14*20+1]= 1.3091837782420783;
1044	daa[14*20+2]= 0.7103720531974738;
1045	daa[14*20+3]= 1.0714605979577547;
1046	daa[14*20+4]= 0.4326227078645523;
1047	daa[14*20+5]= 2.3019177728300728;
1048	daa[14*20+6]= 1.5132807416252063;
1049	daa[14*20+7]= 0.7744933618134962;
1050	daa[14*20+8]= 1.8370555852070649;
1051	daa[14*20+9]= 0.4811402387911145;
1052	daa[14*20+10]= 1.0084320519837335;
1053	daa[14*20+11]= 1.3918935593582853;
1054	daa[14*20+12]= 0.4953193808676289;
1055	daa[14*20+13]= 0.3746821107962129;
1056	daa[15*20+0]= 6.4208961859142883;
1057	daa[15*20+1]= 1.9202994262316166;
1058	daa[15*20+2]= 6.1234512396801764;
1059	daa[15*20+3]= 2.2161944596741829;
1060	daa[15*20+4]= 3.6366815408744255;
1061	daa[15*20+5]= 2.3193703643237220;
1062	daa[15*20+6]= 1.8273535587773553;
1063	daa[15*20+7]= 3.0637776193717610;
1064	daa[15*20+8]= 1.9699895187387506;
1065	daa[15*20+9]= 0.6047491507504744;
1066	daa[15*20+10]= 0.8953754669269811;
1067	daa[15*20+11]= 1.9776630140912268;
1068	daa[15*20+12]= 1.0657482318076852;
1069	daa[15*20+13]= 1.1079144700606407;
1070	daa[15*20+14]= 3.5465914843628927;
1071	daa[16*20+0]= 5.2892514169776437;
1072	daa[16*20+1]= 1.3363401740560601;
1073	daa[16*20+2]= 3.8852506105922231;
1074	daa[16*20+3]= 1.5066839872944762;
1075	daa[16*20+4]= 1.7557065205837685;
1076	daa[16*20+5]= 2.1576510103471440;
1077	daa[16*20+6]= 1.5839981708584689;
1078	daa[16*20+7]= 0.7147489676267383;
1079	daa[16*20+8]= 1.6136654573285647;
1080	daa[16*20+9]= 2.6344778384442731;
1081	daa[16*20+10]= 1.0192004372506540;
1082	daa[16*20+11]= 2.5513781312660280;
1083	daa[16*20+12]= 3.3628488360462363;
1084	daa[16*20+13]= 0.6882725908872254;
1085	daa[16*20+14]= 1.9485376673137556;
1086	daa[16*20+15]= 8.8479984061248178;
1087	daa[17*20+0]= 0.5488578478106930;
1088	daa[17*20+1]= 1.5170142153962840;
1089	daa[17*20+2]= 0.1808525752605976;
1090	daa[17*20+3]= 0.2496584188151770;
1091	daa[17*20+4]= 1.6275179891253113;
1092	daa[17*20+5]= 0.8959082681546182;
1093	daa[17*20+6]= 0.4198391148111098;
1094	daa[17*20+7]= 0.9349753595598769;
1095	daa[17*20+8]= 0.6301954684360302;
1096	daa[17*20+9]= 0.5604648274060783;
1097	daa[17*20+10]= 1.5183114434679339;
1098	daa[17*20+11]= 0.5851920879490173;
1099	daa[17*20+12]= 1.4680478689711018;
1100	daa[17*20+13]= 3.3448437239772266;
1101	daa[17*20+14]= 0.4326058001438786;
1102	daa[17*20+15]= 0.6791126595939816;
1103	daa[17*20+16]= 0.4514203099376473;
1104	daa[18*20+0]= 0.5411769916657778;
1105	daa[18*20+1]= 0.8912614404565405;
1106	daa[18*20+2]= 1.0894926581511342;
1107	daa[18*20+3]= 0.7447620891784513;
1108	daa[18*20+4]= 2.1579775140421025;
1109	daa[18*20+5]= 0.9183596801412757;
1110	daa[18*20+6]= 0.5818111331782764;
1111	daa[18*20+7]= 0.3374467649724478;
1112	daa[18*20+8]= 7.7587442309146040;
1113	daa[18*20+9]= 0.8626796044156272;
1114	daa[18*20+10]= 1.2452243224541324;
1115	daa[18*20+11]= 0.7835447533710449;
1116	daa[18*20+12]= 1.0899165770956820;
1117	daa[18*20+13]= 10.384852333133459;
1118	daa[18*20+14]= 0.4819109019647465;
1119	daa[18*20+15]= 0.9547229305958682;
1120	daa[18*20+16]= 0.8564314184691215;
1121	daa[18*20+17]= 4.5377235790405388;
1122	daa[19*20+0]= 4.6501894691803214;
1123	daa[19*20+1]= 0.7807017855806767;
1124	daa[19*20+2]= 0.4586061981719967;
1125	daa[19*20+3]= 0.4594535241660911;
1126	daa[19*20+4]= 2.2627456996290891;
1127	daa[19*20+5]= 0.6366932501396869;
1128	daa[19*20+6]= 0.8940572875547330;
1129	daa[19*20+7]= 0.6193321034173915;
1130	daa[19*20+8]= 0.5333220944030346;
1131	daa[19*20+9]= 14.872933461519061;
1132	daa[19*20+10]= 3.5458093276667237;
1133	daa[19*20+11]= 0.7801080335991272;
1134	daa[19*20+12]= 4.0584577156753401;
1135	daa[19*20+13]= 1.7039730522675411;
1136	daa[19*20+14]= 0.5985498912985666;
1137	daa[19*20+15]= 0.9305232113028208;
1138	daa[19*20+16]= 3.4242218450865543;
1139	daa[19*20+17]= 0.5658969249032649;
1140	daa[19*20+18]= 1.0000000000000000;
1141
1142	f[0]= 0.0770764620135024;
1143	f[1]= 0.0500819370772208;
1144	f[2]= 0.0462377395993731;
1145	f[3]= 0.0537929860758246;
1146	f[4]= 0.0144533387583345;
1147	f[5]= 0.0408923608974345;
1148	f[6]= 0.0633579339160905;
1149	f[7]= 0.0655672355884439;
1150	f[8]= 0.0218802687005936;
1151	f[9]= 0.0591969699027449;
1152	f[10]= 0.0976461276528445;
1153	f[11]= 0.0592079410822730;
1154	f[12]= 0.0220695876653368;
1155	f[13]= 0.0413508521834260;
1156	f[14]= 0.0476871596856874;
1157	f[15]= 0.0707295165111524;
1158	f[16]= 0.0567759161524817;
1159	f[17]= 0.0127019797647213;
1160	f[18]= 0.0323746050281867;
1161	f[19]= 0.0669190817443274;
1162	}
1163	break;
1164	case BLOSUM62:
1165	{
1166	daa[120+0]= 0.735790389698; daa[220+0]= 0.485391055466; daa[2*20+1]= 1.297446705134;
1167	daa[3*20+0]= 0.543161820899;
1168	daa[320+1]= 0.500964408555; daa[320+2]= 3.180100048216; daa[4*20+0]= 1.45999531047;
1169	daa[4*20+1]= 0.227826574209;
1170	daa[420+2]= 0.397358949897; daa[420+3]= 0.240836614802; daa[5*20+0]= 1.199705704602;
1171	daa[5*20+1]= 3.020833610064;
1172	daa[520+2]= 1.839216146992; daa[520+3]= 1.190945703396; daa[5*20+4]= 0.32980150463;
1173	daa[6*20+0]= 1.1709490428;
1174	daa[620+1]= 1.36057419042; daa[620+2]= 1.24048850864; daa[6*20+3]= 3.761625208368;
1175	daa[6*20+4]= 0.140748891814;
1176	daa[620+5]= 5.528919177928; daa[720+0]= 1.95588357496; daa[7*20+1]= 0.418763308518;
1177	daa[7*20+2]= 1.355872344485;
1178	daa[720+3]= 0.798473248968; daa[720+4]= 0.418203192284; daa[7*20+5]= 0.609846305383;
1179	daa[7*20+6]= 0.423579992176;
1180	daa[820+0]= 0.716241444998; daa[820+1]= 1.456141166336; daa[8*20+2]= 2.414501434208;
1181	daa[8*20+3]= 0.778142664022;
1182	daa[820+4]= 0.354058109831; daa[820+5]= 2.43534113114; daa[8*20+6]= 1.626891056982;
1183	daa[8*20+7]= 0.539859124954;
1184	daa[920+0]= 0.605899003687; daa[920+1]= 0.232036445142; daa[9*20+2]= 0.283017326278;
1185	daa[9*20+3]= 0.418555732462;
1186	daa[920+4]= 0.774894022794; daa[920+5]= 0.236202451204; daa[9*20+6]= 0.186848046932;
1187	daa[9*20+7]= 0.189296292376;
1188	daa[920+8]= 0.252718447885; daa[1020+0]= 0.800016530518; daa[10*20+1]= 0.622711669692;
1189	daa[10*20+2]= 0.211888159615;
1190	daa[1020+3]= 0.218131577594; daa[1020+4]= 0.831842640142; daa[10*20+5]= 0.580737093181;
1191	daa[10*20+6]= 0.372625175087;
1192	daa[1020+7]= 0.217721159236; daa[1020+8]= 0.348072209797; daa[10*20+9]= 3.890963773304;
1193	daa[11*20+0]= 1.295201266783;
1194	daa[1120+1]= 5.411115141489; daa[1120+2]= 1.593137043457; daa[11*20+3]= 1.032447924952;
1195	daa[11*20+4]= 0.285078800906;
1196	daa[1120+5]= 3.945277674515; daa[1120+6]= 2.802427151679; daa[11*20+7]= 0.752042440303;
1197	daa[11*20+8]= 1.022507035889;
1198	daa[1120+9]= 0.406193586642; daa[1120+10]= 0.445570274261;daa[12*20+0]= 1.253758266664;
1199	daa[12*20+1]= 0.983692987457;
1200	daa[1220+2]= 0.648441278787; daa[1220+3]= 0.222621897958; daa[12*20+4]= 0.76768882348;
1201	daa[12*20+5]= 2.494896077113;
1202	daa[1220+6]= 0.55541539747; daa[1220+7]= 0.459436173579; daa[12*20+8]= 0.984311525359;
1203	daa[12*20+9]= 3.364797763104;
1204	daa[1220+10]= 6.030559379572;daa[1220+11]= 1.073061184332;daa[13*20+0]= 0.492964679748;
1205	daa[13*20+1]= 0.371644693209;
1206	daa[1320+2]= 0.354861249223; daa[1320+3]= 0.281730694207; daa[13*20+4]= 0.441337471187;
1207	daa[13*20+5]= 0.14435695975;
1208	daa[1320+6]= 0.291409084165; daa[1320+7]= 0.368166464453; daa[13*20+8]= 0.714533703928;
1209	daa[13*20+9]= 1.517359325954;
1210	daa[1320+10]= 2.064839703237;daa[1320+11]= 0.266924750511;daa[13*20+12]= 1.77385516883;
1211	daa[14*20+0]= 1.173275900924;
1212	daa[1420+1]= 0.448133661718; daa[1420+2]= 0.494887043702; daa[14*20+3]= 0.730628272998;
1213	daa[14*20+4]= 0.356008498769;
1214	daa[1420+5]= 0.858570575674; daa[1420+6]= 0.926563934846; daa[1420+7]= 0.504086599527; daa[1420+8]= 0.527007339151;
1215	daa[1420+9]= 0.388355409206; daa[1420+10]= 0.374555687471;daa[1420+11]= 1.047383450722;daa[1420+12]= 0.454123625103;
1216	daa[1420+13]= 0.233597909629;daa[1520+0]= 4.325092687057; daa[1520+1]= 1.12278310421; daa[1520+2]= 2.904101656456;
1217	daa[1520+3]= 1.582754142065; daa[1520+4]= 1.197188415094; daa[1520+5]= 1.934870924596; daa[1520+6]= 1.769893238937;
1218	daa[1520+7]= 1.509326253224; daa[1520+8]= 1.11702976291; daa[1520+9]= 0.35754441246; daa[1520+10]= 0.352969184527;
1219	daa[1520+11]= 1.752165917819;daa[1520+12]= 0.918723415746;daa[1520+13]= 0.540027644824;daa[1520+14]= 1.169129577716;
1220	daa[1620+0]= 1.729178019485; daa[1620+1]= 0.914665954563; daa[1620+2]= 1.898173634533; daa[1620+3]= 0.934187509431;
1221	daa[1620+4]= 1.119831358516; daa[1620+5]= 1.277480294596; daa[1620+6]= 1.071097236007; daa[1620+7]= 0.641436011405;
1222	daa[1620+8]= 0.585407090225; daa[1620+9]= 1.17909119726; daa[1620+10]= 0.915259857694;daa[1620+11]= 1.303875200799;
1223	daa[1620+12]= 1.488548053722;daa[1620+13]= 0.488206118793;daa[1620+14]= 1.005451683149;daa[1620+15]= 5.15155629227;
1224	daa[1720+0]= 0.465839367725; daa[1720+1]= 0.426382310122; daa[1720+2]= 0.191482046247; daa[1720+3]= 0.145345046279;
1225	daa[1720+4]= 0.527664418872; daa[1720+5]= 0.758653808642; daa[1720+6]= 0.407635648938; daa[1720+7]= 0.508358924638;
1226	daa[1720+8]= 0.30124860078; daa[1720+9]= 0.34198578754; daa[1720+10]= 0.6914746346; daa[1720+11]= 0.332243040634;
1227	daa[1720+12]= 0.888101098152;daa[1720+13]= 2.074324893497;daa[1720+14]= 0.252214830027;daa[1720+15]= 0.387925622098;
1228	daa[1720+16]= 0.513128126891;daa[1820+0]= 0.718206697586; daa[1820+1]= 0.720517441216; daa[1820+2]= 0.538222519037;
1229	daa[1820+3]= 0.261422208965; daa[1820+4]= 0.470237733696; daa[1820+5]= 0.95898974285; daa[1820+6]= 0.596719300346;
1230	daa[1820+7]= 0.308055737035; daa[1820+8]= 4.218953969389; daa[1820+9]= 0.674617093228; daa[1820+10]= 0.811245856323;
1231	daa[1820+11]= 0.7179934869; daa[1820+12]= 0.951682162246;daa[1820+13]= 6.747260430801;daa[1820+14]= 0.369405319355;
1232	daa[1820+15]= 0.796751520761;daa[1820+16]= 0.801010243199;daa[1820+17]= 4.054419006558;daa[1920+0]= 2.187774522005;
1233	daa[1920+1]= 0.438388343772; daa[1920+2]= 0.312858797993; daa[1920+3]= 0.258129289418; daa[1920+4]= 1.116352478606;
1234	daa[1920+5]= 0.530785790125; daa[1920+6]= 0.524253846338; daa[1920+7]= 0.25334079019; daa[1920+8]= 0.20155597175;
1235	daa[1920+9]= 8.311839405458; daa[1920+10]= 2.231405688913;daa[1920+11]= 0.498138475304;daa[1920+12]= 2.575850755315;
1236	daa[1920+13]= 0.838119610178;daa[1920+14]= 0.496908410676;daa[1920+15]= 0.561925457442;daa[1920+16]= 2.253074051176;
1237	daa[1920+17]= 0.266508731426;daa[1920+18]= 1;
1238
1239	f[0]= 0.074; f[1]= 0.052; f[2]= 0.045; f[3]= 0.054;
1240	f[4]= 0.025; f[5]= 0.034; f[6]= 0.054; f[7]= 0.074;
1241	f[8]= 0.026; f[9]= 0.068; f[10]= 0.099; f[11]= 0.058;
1242	f[12]= 0.025; f[13]= 0.047; f[14]= 0.039; f[15]= 0.057;
1243	f[16]= 0.051; f[17]= 0.013; f[18]= 0.032; f[19]= 0.073;
1244	}
1245	break;
1246	case MTMAM:
1247	{
1248	daa[120+0]= 32; daa[220+0]= 2; daa[220+1]= 4; daa[320+0]= 11;
1249	daa[320+1]= 0; daa[320+2]= 864; daa[420+0]= 0; daa[420+1]= 186;
1250	daa[420+2]= 0; daa[420+3]= 0; daa[520+0]= 0; daa[520+1]= 246;
1251	daa[520+2]= 8; daa[520+3]= 49; daa[520+4]= 0; daa[620+0]= 0;
1252	daa[620+1]= 0; daa[620+2]= 0; daa[620+3]= 569; daa[620+4]= 0;
1253	daa[620+5]= 274; daa[720+0]= 78; daa[720+1]= 18; daa[720+2]= 47;
1254	daa[720+3]= 79; daa[720+4]= 0; daa[720+5]= 0; daa[720+6]= 22;
1255	daa[820+0]= 8; daa[820+1]= 232; daa[820+2]= 458; daa[820+3]= 11;
1256	daa[820+4]= 305; daa[820+5]= 550; daa[820+6]= 22; daa[820+7]= 0;
1257	daa[920+0]= 75; daa[920+1]= 0; daa[920+2]= 19; daa[920+3]= 0;
1258	daa[920+4]= 41; daa[920+5]= 0; daa[920+6]= 0; daa[920+7]= 0;
1259	daa[920+8]= 0; daa[1020+0]= 21; daa[1020+1]= 6; daa[1020+2]= 0;
1260	daa[1020+3]= 0; daa[1020+4]= 27; daa[1020+5]= 20; daa[1020+6]= 0;
1261	daa[1020+7]= 0; daa[1020+8]= 26; daa[1020+9]= 232; daa[1120+0]= 0;
1262	daa[1120+1]= 50; daa[1120+2]= 408; daa[1120+3]= 0; daa[1120+4]= 0;
1263	daa[1120+5]= 242; daa[1120+6]= 215; daa[1120+7]= 0; daa[1120+8]= 0;
1264	daa[1120+9]= 6; daa[1120+10]= 4; daa[1220+0]= 76; daa[1220+1]= 0;
1265	daa[1220+2]= 21; daa[1220+3]= 0; daa[1220+4]= 0; daa[1220+5]= 22;
1266	daa[1220+6]= 0; daa[1220+7]= 0; daa[1220+8]= 0; daa[1220+9]= 378;
1267	daa[1220+10]= 609; daa[1220+11]= 59; daa[1320+0]= 0; daa[1320+1]= 0;
1268	daa[1320+2]= 6; daa[1320+3]= 5; daa[1320+4]= 7; daa[1320+5]= 0;
1269	daa[1320+6]= 0; daa[1320+7]= 0; daa[1320+8]= 0; daa[1320+9]= 57;
1270	daa[1320+10]= 246; daa[1320+11]= 0; daa[1320+12]= 11; daa[1420+0]= 53;
1271	daa[1420+1]= 9; daa[1420+2]= 33; daa[1420+3]= 2; daa[1420+4]= 0;
1272	daa[1420+5]= 51; daa[1420+6]= 0; daa[1420+7]= 0; daa[1420+8]= 53;
1273	daa[1420+9]= 5; daa[1420+10]= 43; daa[1420+11]= 18; daa[1420+12]= 0;
1274	daa[1420+13]= 17; daa[1520+0]= 342; daa[1520+1]= 3; daa[1520+2]= 446;
1275	daa[1520+3]= 16; daa[1520+4]= 347; daa[1520+5]= 30; daa[1520+6]= 21;
1276	daa[1520+7]= 112; daa[1520+8]= 20; daa[1520+9]= 0; daa[1520+10]= 74;
1277	daa[1520+11]= 65; daa[1520+12]= 47; daa[1520+13]= 90; daa[1520+14]= 202;
1278	daa[1620+0]= 681; daa[1620+1]= 0; daa[1620+2]= 110; daa[1620+3]= 0;
1279	daa[1620+4]= 114; daa[1620+5]= 0; daa[1620+6]= 4; daa[1620+7]= 0;
1280	daa[1620+8]= 1; daa[1620+9]= 360; daa[1620+10]= 34; daa[1620+11]= 50;
1281	daa[1620+12]= 691; daa[1620+13]= 8; daa[1620+14]= 78; daa[1620+15]= 614;
1282	daa[1720+0]= 5; daa[1720+1]= 16; daa[1720+2]= 6; daa[1720+3]= 0;
1283	daa[1720+4]= 65; daa[1720+5]= 0; daa[1720+6]= 0; daa[1720+7]= 0;
1284	daa[1720+8]= 0; daa[1720+9]= 0; daa[1720+10]= 12; daa[1720+11]= 0;
1285	daa[1720+12]= 13; daa[1720+13]= 0; daa[1720+14]= 7; daa[1720+15]= 17;
1286	daa[1720+16]= 0; daa[1820+0]= 0; daa[1820+1]= 0; daa[1820+2]= 156;
1287	daa[1820+3]= 0; daa[1820+4]= 530; daa[1820+5]= 54; daa[1820+6]= 0;
1288	daa[1820+7]= 1; daa[1820+8]= 1525;daa[1820+9]= 16; daa[1820+10]= 25;
1289	daa[1820+11]= 67; daa[1820+12]= 0; daa[1820+13]= 682; daa[1820+14]= 8;
1290	daa[1820+15]= 107; daa[1820+16]= 0; daa[1820+17]= 14; daa[1920+0]= 398;
1291	daa[1920+1]= 0; daa[1920+2]= 0; daa[1920+3]= 10; daa[1920+4]= 0;
1292	daa[1920+5]= 33; daa[1920+6]= 20; daa[1920+7]= 5; daa[1920+8]= 0;
1293	daa[1920+9]= 2220; daa[1920+10]= 100;daa[1920+11]= 0; daa[1920+12]= 832;
1294	daa[1920+13]= 6; daa[1920+14]= 0; daa[1920+15]= 0; daa[1920+16]= 237;
1295	daa[1920+17]= 0; daa[1920+18]= 0;
1296
1297	f[0]= 0.06920; f[1]= 0.01840; f[2]= 0.04000; f[3]= 0.018600;
1298	f[4]= 0.00650; f[5]= 0.02380; f[6]= 0.02360; f[7]= 0.055700;
1299	f[8]= 0.02770; f[9]= 0.09050; f[10]=0.16750; f[11]= 0.02210;
1300	f[12]=0.05610; f[13]= 0.06110; f[14]=0.05360; f[15]= 0.07250;
1301	f[16]=0.08700; f[17]= 0.02930; f[18]=0.03400; f[19]= 0.04280;
1302	}
1303	break;
1304	case LG:
1305	{
1306	daa[1*20+0] = 0.425093;
1307
1308	daa[220+0] = 0.276818; daa[220+1] = 0.751878;
1309
1310	daa[320+0] = 0.395144; daa[320+1] = 0.123954; daa[3*20+2] = 5.076149;
1311
1312	daa[420+0] = 2.489084; daa[420+1] = 0.534551; daa[420+2] = 0.528768; daa[420+3] = 0.062556;
1313
1314	daa[520+0] = 0.969894; daa[520+1] = 2.807908; daa[520+2] = 1.695752; daa[520+3] = 0.523386; daa[5*20+4] = 0.084808;
1315
1316	daa[620+0] = 1.038545; daa[620+1] = 0.363970; daa[620+2] = 0.541712; daa[620+3] = 5.243870; daa[620+4] = 0.003499; daa[620+5] = 4.128591;
1317
1318	daa[720+0] = 2.066040; daa[720+1] = 0.390192; daa[720+2] = 1.437645; daa[720+3] = 0.844926; daa[720+4] = 0.569265; daa[720+5] = 0.267959; daa[7*20+6] = 0.348847;
1319
1320	daa[820+0] = 0.358858; daa[820+1] = 2.426601; daa[820+2] = 4.509238; daa[820+3] = 0.927114; daa[820+4] = 0.640543; daa[820+5] = 4.813505; daa[8*20+6] = 0.423881;
1321	daa[8*20+7] = 0.311484;
1322
1323	daa[920+0] = 0.149830; daa[920+1] = 0.126991; daa[920+2] = 0.191503; daa[920+3] = 0.010690; daa[920+4] = 0.320627; daa[920+5] = 0.072854; daa[9*20+6] = 0.044265;
1324	daa[920+7] = 0.008705; daa[920+8] = 0.108882;
1325
1326	daa[1020+0] = 0.395337; daa[1020+1] = 0.301848; daa[1020+2] = 0.068427; daa[1020+3] = 0.015076; daa[1020+4] = 0.594007; daa[1020+5] = 0.582457; daa[10*20+6] = 0.069673;
1327	daa[1020+7] = 0.044261; daa[1020+8] = 0.366317; daa[10*20+9] = 4.145067 ;
1328
1329	daa[1120+0] = 0.536518; daa[1120+1] = 6.326067; daa[1120+2] = 2.145078; daa[1120+3] = 0.282959; daa[1120+4] = 0.013266; daa[1120+5] = 3.234294; daa[11*20+6] = 1.807177;
1330	daa[1120+7] = 0.296636; daa[1120+8] = 0.697264; daa[1120+9] = 0.159069; daa[1120+10] = 0.137500;
1331
1332
1333	daa[1220+0] = 1.124035; daa[1220+1] = 0.484133; daa[1220+2] = 0.371004; daa[1220+3] = 0.025548; daa[1220+4] = 0.893680; daa[1220+5] = 1.672569; daa[12*20+6] = 0.173735;
1334	daa[1220+7] = 0.139538; daa[1220+8] = 0.442472; daa[1220+9] = 4.273607; daa[1220+10] = 6.312358; daa[12*20+11] = 0.656604;
1335
1336	daa[1320+0] = 0.253701; daa[1320+1] = 0.052722;daa[1320+2] = 0.089525; daa[1320+3] = 0.017416; daa[1320+4] = 1.105251; daa[1320+5] = 0.035855; daa[13*20+6] = 0.018811;
1337	daa[1320+7] = 0.089586; daa[1320+8] = 0.682139; daa[1320+9] = 1.112727; daa[1320+10] = 2.592692; daa[1320+11] = 0.023918; daa[1320+12] = 1.798853;
1338
1339	daa[1420+0] = 1.177651; daa[1420+1] = 0.332533;daa[1420+2] = 0.161787; daa[1420+3] = 0.394456; daa[1420+4] = 0.075382; daa[1420+5] = 0.624294; daa[14*20+6] = 0.419409;
1340	daa[1420+7] = 0.196961; daa[1420+8] = 0.508851; daa[1420+9] = 0.078281; daa[1420+10] = 0.249060; daa[1420+11] = 0.390322; daa[1420+12] = 0.099849;
1341	daa[14*20+13] = 0.094464;
1342
1343	daa[1520+0] = 4.727182; daa[1520+1] = 0.858151;daa[1520+2] = 4.008358; daa[1520+3] = 1.240275; daa[1520+4] = 2.784478; daa[1520+5] = 1.223828; daa[15*20+6] = 0.611973;
1344	daa[1520+7] = 1.739990; daa[1520+8] = 0.990012; daa[1520+9] = 0.064105; daa[1520+10] = 0.182287; daa[1520+11] = 0.748683; daa[1520+12] = 0.346960;
1345	daa[1520+13] = 0.361819; daa[1520+14] = 1.338132;
1346
1347	daa[1620+0] = 2.139501; daa[1620+1] = 0.578987;daa[1620+2] = 2.000679; daa[1620+3] = 0.425860; daa[1620+4] = 1.143480; daa[1620+5] = 1.080136; daa[16*20+6] = 0.604545;
1348	daa[1620+7] = 0.129836; daa[1620+8] = 0.584262; daa[1620+9] = 1.033739; daa[1620+10] = 0.302936; daa[1620+11] = 1.136863; daa[1620+12] = 2.020366;
1349	daa[1620+13] = 0.165001; daa[1620+14] = 0.571468; daa[16*20+15] = 6.472279;
1350
1351	daa[1720+0] = 0.180717; daa[1720+1] = 0.593607;daa[1720+2] = 0.045376; daa[1720+3] = 0.029890; daa[1720+4] = 0.670128; daa[1720+5] = 0.236199; daa[17*20+6] = 0.077852;
1352	daa[1720+7] = 0.268491; daa[1720+8] = 0.597054; daa[1720+9] = 0.111660; daa[1720+10] = 0.619632; daa[1720+11] = 0.049906; daa[1720+12] = 0.696175;
1353	daa[1720+13] = 2.457121; daa[1720+14] = 0.095131; daa[1720+15] = 0.248862; daa[1720+16] = 0.140825;
1354
1355	daa[1820+0] = 0.218959; daa[1820+1] = 0.314440;daa[1820+2] = 0.612025; daa[1820+3] = 0.135107; daa[1820+4] = 1.165532; daa[1820+5] = 0.257336; daa[18*20+6] = 0.120037;
1356	daa[1820+7] = 0.054679; daa[1820+8] = 5.306834; daa[1820+9] = 0.232523; daa[1820+10] = 0.299648; daa[1820+11] = 0.131932; daa[1820+12] = 0.481306;
1357	daa[1820+13] = 7.803902; daa[1820+14] = 0.089613; daa[1820+15] = 0.400547; daa[1820+16] = 0.245841; daa[18*20+17] = 3.151815;
1358
1359	daa[1920+0] = 2.547870; daa[1920+1] = 0.170887;daa[1920+2] = 0.083688; daa[1920+3] = 0.037967; daa[1920+4] = 1.959291; daa[1920+5] = 0.210332; daa[19*20+6] = 0.245034;
1360	daa[1920+7] = 0.076701; daa[1920+8] = 0.119013; daa[1920+9] = 10.649107; daa[1920+10] = 1.702745; daa[1920+11] = 0.185202; daa[1920+12] = 1.898718;
1361	daa[1920+13] = 0.654683; daa[1920+14] = 0.296501; daa[1920+15] = 0.098369; daa[1920+16] = 2.188158; daa[1920+17] = 0.189510; daa[1920+18] = 0.249313;
1362
1363	f[0] = 0.07906;
1364	f[1] = 0.05594;
1365	f[2] = 0.04198;
1366	f[3] = 0.05305;
1367	f[4] = 0.01294;
1368	f[5] = 0.04077;
1369	f[6] = 0.07158;
1370	f[7] = 0.05734;
1371	f[8] = 0.02235;
1372	f[9] = 0.06216;
1373	f[10] = 0.09908;
1374	f[11] = 0.06460;
1375	f[12] = 0.02295;
1376	f[13] = 0.04230;
1377	f[14] = 0.04404;
1378	f[15] = 0.06120;
1379	f[16] = 0.05329;
1380	f[17] = 0.01207;
1381	f[18] = 0.03415;
1382	f[19] = 0.06915;
1383	}
1384	break;
1385	case MTART:
1386	{
1387
1388
1389	daa[1*20+0]= 0.2;
1390	daa[2*20+0]= 0.2;
1391	daa[2*20+1]= 0.2;
1392	daa[3*20+0]= 1;
1393	daa[3*20+1]= 4;
1394	daa[3*20+2]= 500;
1395	daa[4*20+0]= 254;
1396	daa[4*20+1]= 36;
1397	daa[4*20+2]= 98;
1398	daa[4*20+3]= 11;
1399	daa[5*20+0]= 0.2;
1400	daa[5*20+1]= 154;
1401	daa[5*20+2]= 262;
1402	daa[5*20+3]= 0.2;
1403	daa[5*20+4]= 0.2;
1404	daa[6*20+0]= 0.2;
1405	daa[6*20+1]= 0.2;
1406	daa[6*20+2]= 183;
1407	daa[6*20+3]= 862;
1408	daa[6*20+4]= 0.2;
1409	daa[6*20+5]= 262;
1410	daa[7*20+0]= 200;
1411	daa[7*20+1]= 0.2;
1412	daa[7*20+2]= 121;
1413	daa[7*20+3]= 12;
1414	daa[7*20+4]= 81;
1415	daa[7*20+5]= 3;
1416	daa[7*20+6]= 44;
1417	daa[8*20+0]= 0.2;
1418	daa[8*20+1]= 41;
1419	daa[8*20+2]= 180;
1420	daa[8*20+3]= 0.2;
1421	daa[8*20+4]= 12;
1422	daa[8*20+5]= 314;
1423	daa[8*20+6]= 15;
1424	daa[8*20+7]= 0.2;
1425	daa[9*20+0]= 26;
1426	daa[9*20+1]= 2;
1427	daa[9*20+2]= 21;
1428	daa[9*20+3]= 7;
1429	daa[9*20+4]= 63;
1430	daa[9*20+5]= 11;
1431	daa[9*20+6]= 7;
1432	daa[9*20+7]= 3;
1433	daa[9*20+8]= 0.2;
1434	daa[10*20+0]= 4;
1435	daa[10*20+1]= 2;
1436	daa[10*20+2]= 13;
1437	daa[10*20+3]= 1;
1438	daa[10*20+4]= 79;
1439	daa[10*20+5]= 16;
1440	daa[10*20+6]= 2;
1441	daa[10*20+7]= 1;
1442	daa[10*20+8]= 6;
1443	daa[10*20+9]= 515;
1444	daa[11*20+0]= 0.2;
1445	daa[11*20+1]= 209;
1446	daa[11*20+2]= 467;
1447	daa[11*20+3]= 2;
1448	daa[11*20+4]= 0.2;
1449	daa[11*20+5]= 349;
1450	daa[11*20+6]= 106;
1451	daa[11*20+7]= 0.2;
1452	daa[11*20+8]= 0.2;
1453	daa[11*20+9]= 3;
1454	daa[11*20+10]= 4;
1455	daa[12*20+0]= 121;
1456	daa[12*20+1]= 5;
1457	daa[12*20+2]= 79;
1458	daa[12*20+3]= 0.2;
1459	daa[12*20+4]= 312;
1460	daa[12*20+5]= 67;
1461	daa[12*20+6]= 0.2;
1462	daa[12*20+7]= 56;
1463	daa[12*20+8]= 0.2;
1464	daa[12*20+9]= 515;
1465	daa[12*20+10]= 885;
1466	daa[12*20+11]= 106;
1467	daa[13*20+0]= 13;
1468	daa[13*20+1]= 5;
1469	daa[13*20+2]= 20;
1470	daa[13*20+3]= 0.2;
1471	daa[13*20+4]= 184;
1472	daa[13*20+5]= 0.2;
1473	daa[13*20+6]= 0.2;
1474	daa[13*20+7]= 1;
1475	daa[13*20+8]= 14;
1476	daa[13*20+9]= 118;
1477	daa[13*20+10]= 263;
1478	daa[13*20+11]= 11;
1479	daa[13*20+12]= 322;
1480	daa[14*20+0]= 49;
1481	daa[14*20+1]= 0.2;
1482	daa[14*20+2]= 17;
1483	daa[14*20+3]= 0.2;
1484	daa[14*20+4]= 0.2;
1485	daa[14*20+5]= 39;
1486	daa[14*20+6]= 8;
1487	daa[14*20+7]= 0.2;
1488	daa[14*20+8]= 1;
1489	daa[14*20+9]= 0.2;
1490	daa[14*20+10]= 12;
1491	daa[14*20+11]= 17;
1492	daa[14*20+12]= 5;
1493	daa[14*20+13]= 15;
1494	daa[15*20+0]= 673;
1495	daa[15*20+1]= 3;
1496	daa[15*20+2]= 398;
1497	daa[15*20+3]= 44;
1498	daa[15*20+4]= 664;
1499	daa[15*20+5]= 52;
1500	daa[15*20+6]= 31;
1501	daa[15*20+7]= 226;
1502	daa[15*20+8]= 11;
1503	daa[15*20+9]= 7;
1504	daa[15*20+10]= 8;
1505	daa[15*20+11]= 144;
1506	daa[15*20+12]= 112;
1507	daa[15*20+13]= 36;
1508	daa[15*20+14]= 87;
1509	daa[16*20+0]= 244;
1510	daa[16*20+1]= 0.2;
1511	daa[16*20+2]= 166;
1512	daa[16*20+3]= 0.2;
1513	daa[16*20+4]= 183;
1514	daa[16*20+5]= 44;
1515	daa[16*20+6]= 43;
1516	daa[16*20+7]= 0.2;
1517	daa[16*20+8]= 19;
1518	daa[16*20+9]= 204;
1519	daa[16*20+10]= 48;
1520	daa[16*20+11]= 70;
1521	daa[16*20+12]= 289;
1522	daa[16*20+13]= 14;
1523	daa[16*20+14]= 47;
1524	daa[16*20+15]= 660;
1525	daa[17*20+0]= 0.2;
1526	daa[17*20+1]= 0.2;
1527	daa[17*20+2]= 8;
1528	daa[17*20+3]= 0.2;
1529	daa[17*20+4]= 22;
1530	daa[17*20+5]= 7;
1531	daa[17*20+6]= 11;
1532	daa[17*20+7]= 2;
1533	daa[17*20+8]= 0.2;
1534	daa[17*20+9]= 0.2;
1535	daa[17*20+10]= 21;
1536	daa[17*20+11]= 16;
1537	daa[17*20+12]= 71;
1538	daa[17*20+13]= 54;
1539	daa[17*20+14]= 0.2;
1540	daa[17*20+15]= 2;
1541	daa[17*20+16]= 0.2;
1542	daa[18*20+0]= 1;
1543	daa[18*20+1]= 4;
1544	daa[18*20+2]= 251;
1545	daa[18*20+3]= 0.2;
1546	daa[18*20+4]= 72;
1547	daa[18*20+5]= 87;
1548	daa[18*20+6]= 8;
1549	daa[18*20+7]= 9;
1550	daa[18*20+8]= 191;
1551	daa[18*20+9]= 12;
1552	daa[18*20+10]= 20;
1553	daa[18*20+11]= 117;
1554	daa[18*20+12]= 71;
1555	daa[18*20+13]= 792;
1556	daa[18*20+14]= 18;
1557	daa[18*20+15]= 30;
1558	daa[18*20+16]= 46;
1559	daa[18*20+17]= 38;
1560	daa[19*20+0]= 340;
1561	daa[19*20+1]= 0.2;
1562	daa[19*20+2]= 23;
1563	daa[19*20+3]= 0.2;
1564	daa[19*20+4]= 350;
1565	daa[19*20+5]= 0.2;
1566	daa[19*20+6]= 14;
1567	daa[19*20+7]= 3;
1568	daa[19*20+8]= 0.2;
1569	daa[19*20+9]= 1855;
1570	daa[19*20+10]= 85;
1571	daa[19*20+11]= 26;
1572	daa[19*20+12]= 281;
1573	daa[19*20+13]= 52;
1574	daa[19*20+14]= 32;
1575	daa[19*20+15]= 61;
1576	daa[19*20+16]= 544;
1577	daa[19*20+17]= 0.2;
1578	daa[19*20+18]= 2;
1579
1580	f[0]= 0.054116;
1581	f[1]= 0.018227;
1582	f[2]= 0.039903;
1583	f[3]= 0.020160;
1584	f[4]= 0.009709;
1585	f[5]= 0.018781;
1586	f[6]= 0.024289;
1587	f[7]= 0.068183;
1588	f[8]= 0.024518;
1589	f[9]= 0.092638;
1590	f[10]= 0.148658;
1591	f[11]= 0.021718;
1592	f[12]= 0.061453;
1593	f[13]= 0.088668;
1594	f[14]= 0.041826;
1595	f[15]= 0.091030;
1596	f[16]= 0.049194;
1597	f[17]= 0.029786;
1598	f[18]= 0.039443;
1599	f[19]= 0.057700;
1600	}
1601	break;
1602	case MTZOA:
1603	{
1604	daa[1*20+0]= 3.3;
1605	daa[2*20+0]= 1.7;
1606	daa[2*20+1]= 33.6;
1607	daa[3*20+0]= 16.1;
1608	daa[3*20+1]= 3.2;
1609	daa[3*20+2]= 617.0;
1610	daa[4*20+0]= 272.5;
1611	daa[4*20+1]= 61.1;
1612	daa[4*20+2]= 94.6;
1613	daa[4*20+3]= 9.5;
1614	daa[5*20+0]= 7.3;
1615	daa[5*20+1]= 231.0;
1616	daa[5*20+2]= 190.3;
1617	daa[5*20+3]= 19.3;
1618	daa[5*20+4]= 49.1;
1619	daa[6*20+0]= 17.1;
1620	daa[6*20+1]= 6.4;
1621	daa[6*20+2]= 174.0;
1622	daa[6*20+3]= 883.6;
1623	daa[6*20+4]= 3.4;
1624	daa[6*20+5]= 349.4;
1625	daa[7*20+0]= 289.3;
1626	daa[7*20+1]= 7.2;
1627	daa[7*20+2]= 99.3;
1628	daa[7*20+3]= 26.0;
1629	daa[7*20+4]= 82.4;
1630	daa[7*20+5]= 8.9;
1631	daa[7*20+6]= 43.1;
1632	daa[8*20+0]= 2.3;
1633	daa[8*20+1]= 61.7;
1634	daa[8*20+2]= 228.9;
1635	daa[8*20+3]= 55.6;
1636	daa[8*20+4]= 37.5;
1637	daa[8*20+5]= 421.8;
1638	daa[8*20+6]= 14.9;
1639	daa[8*20+7]= 7.4;
1640	daa[9*20+0]= 33.2;
1641	daa[9*20+1]= 0.2;
1642	daa[9*20+2]= 24.3;
1643	daa[9*20+3]= 1.5;
1644	daa[9*20+4]= 48.8;
1645	daa[9*20+5]= 0.2;
1646	daa[9*20+6]= 7.3;
1647	daa[9*20+7]= 3.4;
1648	daa[9*20+8]= 1.6;
1649	daa[10*20+0]= 15.6;
1650	daa[10*20+1]= 4.1;
1651	daa[10*20+2]= 7.9;
1652	daa[10*20+3]= 0.5;
1653	daa[10*20+4]= 59.7;
1654	daa[10*20+5]= 23.0;
1655	daa[10*20+6]= 1.0;
1656	daa[10*20+7]= 3.5;
1657	daa[10*20+8]= 6.6;
1658	daa[10*20+9]= 425.2;
1659	daa[11*20+0]= 0.2;
1660	daa[11*20+1]= 292.3;
1661	daa[11*20+2]= 413.4;
1662	daa[11*20+3]= 0.2;
1663	daa[11*20+4]= 0.2;
1664	daa[11*20+5]= 334.0;
1665	daa[11*20+6]= 163.2;
1666	daa[11*20+7]= 10.1;
1667	daa[11*20+8]= 23.9;
1668	daa[11*20+9]= 8.4;
1669	daa[11*20+10]= 6.7;
1670	daa[12*20+0]= 136.5;
1671	daa[12*20+1]= 3.8;
1672	daa[12*20+2]= 73.7;
1673	daa[12*20+3]= 0.2;
1674	daa[12*20+4]= 264.8;
1675	daa[12*20+5]= 83.9;
1676	daa[12*20+6]= 0.2;
1677	daa[12*20+7]= 52.2;
1678	daa[12*20+8]= 7.1;
1679	daa[12*20+9]= 449.7;
1680	daa[12*20+10]= 636.3;
1681	daa[12*20+11]= 83.0;
1682	daa[13*20+0]= 26.5;
1683	daa[13*20+1]= 0.2;
1684	daa[13*20+2]= 12.9;
1685	daa[13*20+3]= 2.0;
1686	daa[13*20+4]= 167.8;
1687	daa[13*20+5]= 9.5;
1688	daa[13*20+6]= 0.2;
1689	daa[13*20+7]= 5.8;
1690	daa[13*20+8]= 13.1;
1691	daa[13*20+9]= 90.3;
1692	daa[13*20+10]= 234.2;
1693	daa[13*20+11]= 16.3;
1694	daa[13*20+12]= 215.6;
1695	daa[14*20+0]= 61.8;
1696	daa[14*20+1]= 7.5;
1697	daa[14*20+2]= 22.6;
1698	daa[14*20+3]= 0.2;
1699	daa[14*20+4]= 8.1;
1700	daa[14*20+5]= 52.2;
1701	daa[14*20+6]= 20.6;
1702	daa[14*20+7]= 1.3;
1703	daa[14*20+8]= 15.6;
1704	daa[14*20+9]= 2.6;
1705	daa[14*20+10]= 11.4;
1706	daa[14*20+11]= 24.3;
1707	daa[14*20+12]= 5.4;
1708	daa[14*20+13]= 10.5;
1709	daa[15*20+0]= 644.9;
1710	daa[15*20+1]= 11.8;
1711	daa[15*20+2]= 420.2;
1712	daa[15*20+3]= 51.4;
1713	daa[15*20+4]= 656.3;
1714	daa[15*20+5]= 96.4;
1715	daa[15*20+6]= 38.4;
1716	daa[15*20+7]= 257.1;
1717	daa[15*20+8]= 23.1;
1718	daa[15*20+9]= 7.2;
1719	daa[15*20+10]= 15.2;
1720	daa[15*20+11]= 144.9;
1721	daa[15*20+12]= 95.3;
1722	daa[15*20+13]= 32.2;
1723	daa[15*20+14]= 79.7;
1724	daa[16*20+0]= 378.1;
1725	daa[16*20+1]= 3.2;
1726	daa[16*20+2]= 184.6;
1727	daa[16*20+3]= 2.3;
1728	daa[16*20+4]= 199.0;
1729	daa[16*20+5]= 39.4;
1730	daa[16*20+6]= 34.5;
1731	daa[16*20+7]= 5.2;
1732	daa[16*20+8]= 19.4;
1733	daa[16*20+9]= 222.3;
1734	daa[16*20+10]= 50.0;
1735	daa[16*20+11]= 75.5;
1736	daa[16*20+12]= 305.1;
1737	daa[16*20+13]= 19.3;
1738	daa[16*20+14]= 56.9;
1739	daa[16*20+15]= 666.3;
1740	daa[17*20+0]= 3.1;
1741	daa[17*20+1]= 16.9;
1742	daa[17*20+2]= 6.4;
1743	daa[17*20+3]= 0.2;
1744	daa[17*20+4]= 36.1;
1745	daa[17*20+5]= 6.1;
1746	daa[17*20+6]= 3.5;
1747	daa[17*20+7]= 12.3;
1748	daa[17*20+8]= 4.5;
1749	daa[17*20+9]= 9.7;
1750	daa[17*20+10]= 27.2;
1751	daa[17*20+11]= 6.6;
1752	daa[17*20+12]= 48.7;
1753	daa[17*20+13]= 58.2;
1754	daa[17*20+14]= 1.3;
1755	daa[17*20+15]= 10.3;
1756	daa[17*20+16]= 3.6;
1757	daa[18*20+0]= 2.1;
1758	daa[18*20+1]= 13.8;
1759	daa[18*20+2]= 141.6;
1760	daa[18*20+3]= 13.9;
1761	daa[18*20+4]= 76.7;
1762	daa[18*20+5]= 52.3;
1763	daa[18*20+6]= 10.0;
1764	daa[18*20+7]= 4.3;
1765	daa[18*20+8]= 266.5;
1766	daa[18*20+9]= 13.1;
1767	daa[18*20+10]= 5.7;
1768	daa[18*20+11]= 45.0;
1769	daa[18*20+12]= 41.4;
1770	daa[18*20+13]= 590.5;
1771	daa[18*20+14]= 4.2;
1772	daa[18*20+15]= 29.7;
1773	daa[18*20+16]= 29.0;
1774	daa[18*20+17]= 79.8;
1775	daa[19*20+0]= 321.9;
1776	daa[19*20+1]= 5.1;
1777	daa[19*20+2]= 7.1;
1778	daa[19*20+3]= 3.7;
1779	daa[19*20+4]= 243.8;
1780	daa[19*20+5]= 9.0;
1781	daa[19*20+6]= 16.3;
1782	daa[19*20+7]= 23.7;
1783	daa[19*20+8]= 0.3;
1784	daa[19*20+9]= 1710.6;
1785	daa[19*20+10]= 126.1;
1786	daa[19*20+11]= 11.1;
1787	daa[19*20+12]= 279.6;
1788	daa[19*20+13]= 59.6;
1789	daa[19*20+14]= 17.9;
1790	daa[19*20+15]= 49.5;
1791	daa[19*20+16]= 396.4;
1792	daa[19*20+17]= 13.7;
1793	daa[19*20+18]= 15.6;
1794
1795	f[0]= 0.069;
1796	f[1]= 0.021;
1797	f[2]= 0.030;
1798	f[3]= 0.020;
1799	f[4]= 0.010;
1800	f[5]= 0.019;
1801	f[6]= 0.025;
1802	f[7]= 0.072;
1803	f[8]= 0.027;
1804	f[9]= 0.085;
1805	f[10]= 0.157;
1806	f[11]= 0.019;
1807	f[12]= 0.051;
1808	f[13]= 0.082;
1809	f[14]= 0.045;
1810	f[15]= 0.081;
1811	f[16]= 0.056;
1812	f[17]= 0.028;
1813	f[18]= 0.037;
1814	f[19]= 0.066;
1815	}
1816	break;
1817	case PMB:
1818	{
1819	daa[1*20+0]= 0.674995699;
1820	daa[2*20+0]= 0.589645178;
1821	daa[2*20+1]= 1.189067034;
1822	daa[3*20+0]= 0.462499504;
1823	daa[3*20+1]= 0.605460903;
1824	daa[3*20+2]= 3.573373315;
1825	daa[4*20+0]= 1.065445546;
1826	daa[4*20+1]= 0.31444833;
1827	daa[4*20+2]= 0.589852457;
1828	daa[4*20+3]= 0.246951424;
1829	daa[5*20+0]= 1.111766964;
1830	daa[5*20+1]= 2.967840934;
1831	daa[5*20+2]= 2.299755865;
1832	daa[5*20+3]= 1.686058219;
1833	daa[5*20+4]= 0.245163782;
1834	daa[6*20+0]= 1.046334652;
1835	daa[6*20+1]= 1.201770702;
1836	daa[6*20+2]= 1.277836748;
1837	daa[6*20+3]= 4.399995525;
1838	daa[6*20+4]= 0.091071867;
1839	daa[6*20+5]= 4.15967899;
1840	daa[7*20+0]= 1.587964372;
1841	daa[7*20+1]= 0.523770553;
1842	daa[7*20+2]= 1.374854049;
1843	daa[7*20+3]= 0.734992057;
1844	daa[7*20+4]= 0.31706632;
1845	daa[7*20+5]= 0.596789898;
1846	daa[7*20+6]= 0.463812837;
1847	daa[8*20+0]= 0.580830874;
1848	daa[8*20+1]= 1.457127446;
1849	daa[8*20+2]= 2.283037894;
1850	daa[8*20+3]= 0.839348444;
1851	daa[8*20+4]= 0.411543728;
1852	daa[8*20+5]= 1.812173605;
1853	daa[8*20+6]= 0.877842609;
1854	daa[8*20+7]= 0.476331437;
1855	daa[9*20+0]= 0.464590585;
1856	daa[9*20+1]= 0.35964586;
1857	daa[9*20+2]= 0.426069419;
1858	daa[9*20+3]= 0.266775558;
1859	daa[9*20+4]= 0.417547309;
1860	daa[9*20+5]= 0.315256838;
1861	daa[9*20+6]= 0.30421529;
1862	daa[9*20+7]= 0.180198883;
1863	daa[9*20+8]= 0.285186418;
1864	daa[10*20+0]= 0.804404505;
1865	daa[10*20+1]= 0.520701585;
1866	daa[10*20+2]= 0.41009447;
1867	daa[10*20+3]= 0.269124919;
1868	daa[10*20+4]= 0.450795211;
1869	daa[10*20+5]= 0.625792937;
1870	daa[10*20+6]= 0.32078471;
1871	daa[10*20+7]= 0.259854426;
1872	daa[10*20+8]= 0.363981358;
1873	daa[10*20+9]= 4.162454693;
1874	daa[11*20+0]= 0.831998835;
1875	daa[11*20+1]= 4.956476453;
1876	daa[11*20+2]= 2.037575629;
1877	daa[11*20+3]= 1.114178954;
1878	daa[11*20+4]= 0.274163536;
1879	daa[11*20+5]= 3.521346591;
1880	daa[11*20+6]= 2.415974716;
1881	daa[11*20+7]= 0.581001076;
1882	daa[11*20+8]= 0.985885486;
1883	daa[11*20+9]= 0.374784947;
1884	daa[11*20+10]= 0.498011337;
1885	daa[12*20+0]= 1.546725076;
1886	daa[12*20+1]= 0.81346254;
1887	daa[12*20+2]= 0.737846301;
1888	daa[12*20+3]= 0.341932741;
1889	daa[12*20+4]= 0.618614612;
1890	daa[12*20+5]= 2.067388546;
1891	daa[12*20+6]= 0.531773639;
1892	daa[12*20+7]= 0.465349326;
1893	daa[12*20+8]= 0.380925433;
1894	daa[12*20+9]= 3.65807012;
1895	daa[12*20+10]= 5.002338375;
1896	daa[12*20+11]= 0.661095832;
1897	daa[13*20+0]= 0.546169219;
1898	daa[13*20+1]= 0.303437244;
1899	daa[13*20+2]= 0.425193716;
1900	daa[13*20+3]= 0.219005213;
1901	daa[13*20+4]= 0.669206193;
1902	daa[13*20+5]= 0.406042546;
1903	daa[13*20+6]= 0.224154698;
1904	daa[13*20+7]= 0.35402891;
1905	daa[13*20+8]= 0.576231691;
1906	daa[13*20+9]= 1.495264661;
1907	daa[13*20+10]= 2.392638293;
1908	daa[13*20+11]= 0.269496317;
1909	daa[13*20+12]= 2.306919847;
1910	daa[14*20+0]= 1.241586045;
1911	daa[14*20+1]= 0.65577338;
1912	daa[14*20+2]= 0.711495595;
1913	daa[14*20+3]= 0.775624818;
1914	daa[14*20+4]= 0.198679914;
1915	daa[14*20+5]= 0.850116543;
1916	daa[14*20+6]= 0.794584081;
1917	daa[14*20+7]= 0.588254139;
1918	daa[14*20+8]= 0.456058589;
1919	daa[14*20+9]= 0.366232942;
1920	daa[14*20+10]= 0.430073179;
1921	daa[14*20+11]= 1.036079005;
1922	daa[14*20+12]= 0.337502282;
1923	daa[14*20+13]= 0.481144863;
1924	daa[15*20+0]= 3.452308792;
1925	daa[15*20+1]= 0.910144334;
1926	daa[15*20+2]= 2.572577221;
1927	daa[15*20+3]= 1.440896785;
1928	daa[15*20+4]= 0.99870098;
1929	daa[15*20+5]= 1.348272505;
1930	daa[15*20+6]= 1.205509425;
1931	daa[15*20+7]= 1.402122097;
1932	daa[15*20+8]= 0.799966711;
1933	daa[15*20+9]= 0.530641901;
1934	daa[15*20+10]= 0.402471997;
1935	daa[15*20+11]= 1.234648153;
1936	daa[15*20+12]= 0.945453716;
1937	daa[15*20+13]= 0.613230817;
1938	daa[15*20+14]= 1.217683028;
1939	daa[16*20+0]= 1.751412803;
1940	daa[16*20+1]= 0.89517149;
1941	daa[16*20+2]= 1.823161023;
1942	daa[16*20+3]= 0.994227284;
1943	daa[16*20+4]= 0.847312432;
1944	daa[16*20+5]= 1.320626678;
1945	daa[16*20+6]= 0.949599791;
1946	daa[16*20+7]= 0.542185658;
1947	daa[16*20+8]= 0.83039281;
1948	daa[16*20+9]= 1.114132523;
1949	daa[16*20+10]= 0.779827336;
1950	daa[16*20+11]= 1.290709079;
1951	daa[16*20+12]= 1.551488041;
1952	daa[16*20+13]= 0.718895136;
1953	daa[16*20+14]= 0.780913179;
1954	daa[16*20+15]= 4.448982584;
1955	daa[17*20+0]= 0.35011051;
1956	daa[17*20+1]= 0.618778365;
1957	daa[17*20+2]= 0.422407388;
1958	daa[17*20+3]= 0.362495245;
1959	daa[17*20+4]= 0.445669347;
1960	daa[17*20+5]= 0.72038474;
1961	daa[17*20+6]= 0.261258229;
1962	daa[17*20+7]= 0.37874827;
1963	daa[17*20+8]= 0.72436751;
1964	daa[17*20+9]= 0.516260502;
1965	daa[17*20+10]= 0.794797115;
1966	daa[17*20+11]= 0.43340962;
1967	daa[17*20+12]= 0.768395107;
1968	daa[17*20+13]= 3.29519344;
1969	daa[17*20+14]= 0.499869138;
1970	daa[17*20+15]= 0.496334956;
1971	daa[17*20+16]= 0.38372361;
1972	daa[18*20+0]= 0.573154753;
1973	daa[18*20+1]= 0.628599063;
1974	daa[18*20+2]= 0.720013799;
1975	daa[18*20+3]= 0.436220437;
1976	daa[18*20+4]= 0.55626163;
1977	daa[18*20+5]= 0.728970584;
1978	daa[18*20+6]= 0.50720003;
1979	daa[18*20+7]= 0.284727562;
1980	daa[18*20+8]= 2.210952064;
1981	daa[18*20+9]= 0.570562395;
1982	daa[18*20+10]= 0.811019594;
1983	daa[18*20+11]= 0.664884513;
1984	daa[18*20+12]= 0.93253606;
1985	daa[18*20+13]= 5.894735673;
1986	daa[18*20+14]= 0.433748126;
1987	daa[18*20+15]= 0.593795813;
1988	daa[18*20+16]= 0.523549536;
1989	daa[18*20+17]= 2.996248013;
1990	daa[19*20+0]= 2.063050067;
1991	daa[19*20+1]= 0.388680158;
1992	daa[19*20+2]= 0.474418852;
1993	daa[19*20+3]= 0.275658381;
1994	daa[19*20+4]= 0.998911631;
1995	daa[19*20+5]= 0.634408285;
1996	daa[19*20+6]= 0.527640634;
1997	daa[19*20+7]= 0.314700907;
1998	daa[19*20+8]= 0.305792277;
1999	daa[19*20+9]= 8.002789424;
2000	daa[19*20+10]= 2.113077156;
2001	daa[19*20+11]= 0.526184203;
2002	daa[19*20+12]= 1.737356217;
2003	daa[19*20+13]= 0.983844803;
2004	daa[19*20+14]= 0.551333603;
2005	daa[19*20+15]= 0.507506011;
2006	daa[19*20+16]= 1.89965079;
2007	daa[19*20+17]= 0.429570747;
2008	daa[19*20+18]= 0.716795463;
2009
2010	f[0]= 0.076;
2011	f[1]= 0.054;
2012	f[2]= 0.038;
2013	f[3]= 0.045;
2014	f[4]= 0.028;
2015	f[5]= 0.034;
2016	f[6]= 0.053;
2017	f[7]= 0.078;
2018	f[8]= 0.030;
2019	f[9]= 0.060;
2020	f[10]= 0.096;
2021	f[11]= 0.052;
2022	f[12]= 0.022;
2023	f[13]= 0.045;
2024	f[14]= 0.042;
2025	f[15]= 0.068;
2026	f[16]= 0.056;
2027	f[17]= 0.016;
2028	f[18]= 0.036;
2029	f[19]= 0.071;
2030	}
2031	break;
2032	case HIVB:
2033	{
2034	daa[1*20+0]= 0.30750700;
2035	daa[2*20+0]= 0.00500000;
2036	daa[2*20+1]= 0.29554300;
2037	daa[3*20+0]= 1.45504000;
2038	daa[3*20+1]= 0.00500000;
2039	daa[3*20+2]= 17.66120000;
2040	daa[4*20+0]= 0.12375800;
2041	daa[4*20+1]= 0.35172100;
2042	daa[4*20+2]= 0.08606420;
2043	daa[4*20+3]= 0.00500000;
2044	daa[5*20+0]= 0.05511280;
2045	daa[5*20+1]= 3.42150000;
2046	daa[5*20+2]= 0.67205200;
2047	daa[5*20+3]= 0.00500000;
2048	daa[5*20+4]= 0.00500000;
2049	daa[6*20+0]= 1.48135000;
2050	daa[6*20+1]= 0.07492180;
2051	daa[6*20+2]= 0.07926330;
2052	daa[6*20+3]= 10.58720000;
2053	daa[6*20+4]= 0.00500000;
2054	daa[6*20+5]= 2.56020000;
2055	daa[7*20+0]= 2.13536000;
2056	daa[7*20+1]= 3.65345000;
2057	daa[7*20+2]= 0.32340100;
2058	daa[7*20+3]= 2.83806000;
2059	daa[7*20+4]= 0.89787100;
2060	daa[7*20+5]= 0.06191370;
2061	daa[7*20+6]= 3.92775000;
2062	daa[8*20+0]= 0.08476130;
2063	daa[8*20+1]= 9.04044000;
2064	daa[8*20+2]= 7.64585000;
2065	daa[8*20+3]= 1.91690000;
2066	daa[8*20+4]= 0.24007300;
2067	daa[8*20+5]= 7.05545000;
2068	daa[8*20+6]= 0.11974000;
2069	daa[8*20+7]= 0.00500000;
2070	daa[9*20+0]= 0.00500000;
2071	daa[9*20+1]= 0.67728900;
2072	daa[9*20+2]= 0.68056500;
2073	daa[9*20+3]= 0.01767920;
2074	daa[9*20+4]= 0.00500000;
2075	daa[9*20+5]= 0.00500000;
2076	daa[9*20+6]= 0.00609079;
2077	daa[9*20+7]= 0.00500000;
2078	daa[9*20+8]= 0.10311100;
2079	daa[10*20+0]= 0.21525600;
2080	daa[10*20+1]= 0.70142700;
2081	daa[10*20+2]= 0.00500000;
2082	daa[10*20+3]= 0.00876048;
2083	daa[10*20+4]= 0.12977700;
2084	daa[10*20+5]= 1.49456000;
2085	daa[10*20+6]= 0.00500000;
2086	daa[10*20+7]= 0.00500000;
2087	daa[10*20+8]= 1.74171000;
2088	daa[10*20+9]= 5.95879000;
2089	daa[11*20+0]= 0.00500000;
2090	daa[11*20+1]= 20.45000000;
2091	daa[11*20+2]= 7.90443000;
2092	daa[11*20+3]= 0.00500000;
2093	daa[11*20+4]= 0.00500000;
2094	daa[11*20+5]= 6.54737000;
2095	daa[11*20+6]= 4.61482000;
2096	daa[11*20+7]= 0.52170500;
2097	daa[11*20+8]= 0.00500000;
2098	daa[11*20+9]= 0.32231900;
2099	daa[11*20+10]= 0.08149950;
2100	daa[12*20+0]= 0.01866430;
2101	daa[12*20+1]= 2.51394000;
2102	daa[12*20+2]= 0.00500000;
2103	daa[12*20+3]= 0.00500000;
2104	daa[12*20+4]= 0.00500000;
2105	daa[12*20+5]= 0.30367600;
2106	daa[12*20+6]= 0.17578900;
2107	daa[12*20+7]= 0.00500000;
2108	daa[12*20+8]= 0.00500000;
2109	daa[12*20+9]= 11.20650000;
2110	daa[12*20+10]= 5.31961000;
2111	daa[12*20+11]= 1.28246000;
2112	daa[13*20+0]= 0.01412690;
2113	daa[13*20+1]= 0.00500000;
2114	daa[13*20+2]= 0.00500000;
2115	daa[13*20+3]= 0.00500000;
2116	daa[13*20+4]= 9.29815000;
2117	daa[13*20+5]= 0.00500000;
2118	daa[13*20+6]= 0.00500000;
2119	daa[13*20+7]= 0.29156100;
2120	daa[13*20+8]= 0.14555800;
2121	daa[13*20+9]= 3.39836000;
2122	daa[13*20+10]= 8.52484000;
2123	daa[13*20+11]= 0.03426580;
2124	daa[13*20+12]= 0.18802500;
2125	daa[14*20+0]= 2.12217000;
2126	daa[14*20+1]= 1.28355000;
2127	daa[14*20+2]= 0.00739578;
2128	daa[14*20+3]= 0.03426580;
2129	daa[14*20+4]= 0.00500000;
2130	daa[14*20+5]= 4.47211000;
2131	daa[14*20+6]= 0.01202260;
2132	daa[14*20+7]= 0.00500000;
2133	daa[14*20+8]= 2.45318000;
2134	daa[14*20+9]= 0.04105930;
2135	daa[14*20+10]= 2.07757000;
2136	daa[14*20+11]= 0.03138620;
2137	daa[14*20+12]= 0.00500000;
2138	daa[14*20+13]= 0.00500000;
2139	daa[15*20+0]= 2.46633000;
2140	daa[15*20+1]= 3.47910000;
2141	daa[15*20+2]= 13.14470000;
2142	daa[15*20+3]= 0.52823000;
2143	daa[15*20+4]= 4.69314000;
2144	daa[15*20+5]= 0.11631100;
2145	daa[15*20+6]= 0.00500000;
2146	daa[15*20+7]= 4.38041000;
2147	daa[15*20+8]= 0.38274700;
2148	daa[15*20+9]= 1.21803000;
2149	daa[15*20+10]= 0.92765600;
2150	daa[15*20+11]= 0.50411100;
2151	daa[15*20+12]= 0.00500000;
2152	daa[15*20+13]= 0.95647200;
2153	daa[15*20+14]= 5.37762000;
2154	daa[16*20+0]= 15.91830000;
2155	daa[16*20+1]= 2.86868000;
2156	daa[16*20+2]= 6.88667000;
2157	daa[16*20+3]= 0.27472400;
2158	daa[16*20+4]= 0.73996900;
2159	daa[16*20+5]= 0.24358900;
2160	daa[16*20+6]= 0.28977400;
2161	daa[16*20+7]= 0.36961500;
2162	daa[16*20+8]= 0.71159400;
2163	daa[16*20+9]= 8.61217000;
2164	daa[16*20+10]= 0.04376730;
2165	daa[16*20+11]= 4.67142000;
2166	daa[16*20+12]= 4.94026000;
2167	daa[16*20+13]= 0.01412690;
2168	daa[16*20+14]= 2.01417000;
2169	daa[16*20+15]= 8.93107000;
2170	daa[17*20+0]= 0.00500000;
2171	daa[17*20+1]= 0.99133800;
2172	daa[17*20+2]= 0.00500000;
2173	daa[17*20+3]= 0.00500000;
2174	daa[17*20+4]= 2.63277000;
2175	daa[17*20+5]= 0.02665600;
2176	daa[17*20+6]= 0.00500000;
2177	daa[17*20+7]= 1.21674000;
2178	daa[17*20+8]= 0.06951790;
2179	daa[17*20+9]= 0.00500000;
2180	daa[17*20+10]= 0.74884300;
2181	daa[17*20+11]= 0.00500000;
2182	daa[17*20+12]= 0.08907800;
2183	daa[17*20+13]= 0.82934300;
2184	daa[17*20+14]= 0.04445060;
2185	daa[17*20+15]= 0.02487280;
2186	daa[17*20+16]= 0.00500000;
2187	daa[18*20+0]= 0.00500000;
2188	daa[18*20+1]= 0.00991826;
2189	daa[18*20+2]= 1.76417000;
2190	daa[18*20+3]= 0.67465300;
2191	daa[18*20+4]= 7.57932000;
2192	daa[18*20+5]= 0.11303300;
2193	daa[18*20+6]= 0.07926330;
2194	daa[18*20+7]= 0.00500000;
2195	daa[18*20+8]= 18.69430000;
2196	daa[18*20+9]= 0.14816800;
2197	daa[18*20+10]= 0.11198600;
2198	daa[18*20+11]= 0.00500000;
2199	daa[18*20+12]= 0.00500000;
2200	daa[18*20+13]= 15.34000000;
2201	daa[18*20+14]= 0.03043810;
2202	daa[18*20+15]= 0.64802400;
2203	daa[18*20+16]= 0.10565200;
2204	daa[18*20+17]= 1.28022000;
2205	daa[19*20+0]= 7.61428000;
2206	daa[19*20+1]= 0.08124540;
2207	daa[19*20+2]= 0.02665600;
2208	daa[19*20+3]= 1.04793000;
2209	daa[19*20+4]= 0.42002700;
2210	daa[19*20+5]= 0.02091530;
2211	daa[19*20+6]= 1.02847000;
2212	daa[19*20+7]= 0.95315500;
2213	daa[19*20+8]= 0.00500000;
2214	daa[19*20+9]= 17.73890000;
2215	daa[19*20+10]= 1.41036000;
2216	daa[19*20+11]= 0.26582900;
2217	daa[19*20+12]= 6.85320000;
2218	daa[19*20+13]= 0.72327400;
2219	daa[19*20+14]= 0.00500000;
2220	daa[19*20+15]= 0.07492180;
2221	daa[19*20+16]= 0.70922600;
2222	daa[19*20+17]= 0.00500000;
2223	daa[19*20+18]= 0.04105930;
2224
2225	f[0]= 0.060;
2226	f[1]= 0.066;
2227	f[2]= 0.044;
2228	f[3]= 0.042;
2229	f[4]= 0.020;
2230	f[5]= 0.054;
2231	f[6]= 0.071;
2232	f[7]= 0.072;
2233	f[8]= 0.022;
2234	f[9]= 0.070;
2235	f[10]= 0.099;
2236	f[11]= 0.057;
2237	f[12]= 0.020;
2238	f[13]= 0.029;
2239	f[14]= 0.046;
2240	f[15]= 0.051;
2241	f[16]= 0.054;
2242	f[17]= 0.033;
2243	f[18]= 0.028;
2244	f[19]= 0.062;
2245	}
2246	break;
2247	case HIVW:
2248	{
2249	daa[1*20+0]= 0.0744808;
2250	daa[2*20+0]= 0.6175090;
2251	daa[2*20+1]= 0.1602400;
2252	daa[3*20+0]= 4.4352100;
2253	daa[3*20+1]= 0.0674539;
2254	daa[3*20+2]= 29.4087000;
2255	daa[4*20+0]= 0.1676530;
2256	daa[4*20+1]= 2.8636400;
2257	daa[4*20+2]= 0.0604932;
2258	daa[4*20+3]= 0.0050000;
2259	daa[5*20+0]= 0.0050000;
2260	daa[5*20+1]= 10.6746000;
2261	daa[5*20+2]= 0.3420680;
2262	daa[5*20+3]= 0.0050000;
2263	daa[5*20+4]= 0.0050000;
2264	daa[6*20+0]= 5.5632500;
2265	daa[6*20+1]= 0.0251632;
2266	daa[6*20+2]= 0.2015260;
2267	daa[6*20+3]= 12.1233000;
2268	daa[6*20+4]= 0.0050000;
2269	daa[6*20+5]= 3.2065600;
2270	daa[7*20+0]= 1.8685000;
2271	daa[7*20+1]= 13.4379000;
2272	daa[7*20+2]= 0.0604932;
2273	daa[7*20+3]= 10.3969000;
2274	daa[7*20+4]= 0.0489798;
2275	daa[7*20+5]= 0.0604932;
2276	daa[7*20+6]= 14.7801000;
2277	daa[8*20+0]= 0.0050000;
2278	daa[8*20+1]= 6.8440500;
2279	daa[8*20+2]= 8.5987600;
2280	daa[8*20+3]= 2.3177900;
2281	daa[8*20+4]= 0.0050000;
2282	daa[8*20+5]= 18.5465000;
2283	daa[8*20+6]= 0.0050000;
2284	daa[8*20+7]= 0.0050000;
2285	daa[9*20+0]= 0.0050000;
2286	daa[9*20+1]= 1.3406900;
2287	daa[9*20+2]= 0.9870280;
2288	daa[9*20+3]= 0.1451240;
2289	daa[9*20+4]= 0.0050000;
2290	daa[9*20+5]= 0.0342252;
2291	daa[9*20+6]= 0.0390512;
2292	daa[9*20+7]= 0.0050000;
2293	daa[9*20+8]= 0.0050000;
2294	daa[10*20+0]= 0.1602400;
2295	daa[10*20+1]= 0.5867570;
2296	daa[10*20+2]= 0.0050000;
2297	daa[10*20+3]= 0.0050000;
2298	daa[10*20+4]= 0.0050000;
2299	daa[10*20+5]= 2.8904800;
2300	daa[10*20+6]= 0.1298390;
2301	daa[10*20+7]= 0.0489798;
2302	daa[10*20+8]= 1.7638200;
2303	daa[10*20+9]= 9.1024600;
2304	daa[11*20+0]= 0.5927840;
2305	daa[11*20+1]= 39.8897000;
2306	daa[11*20+2]= 10.6655000;
2307	daa[11*20+3]= 0.8943130;
2308	daa[11*20+4]= 0.0050000;
2309	daa[11*20+5]= 13.0705000;
2310	daa[11*20+6]= 23.9626000;
2311	daa[11*20+7]= 0.2794250;
2312	daa[11*20+8]= 0.2240600;
2313	daa[11*20+9]= 0.8174810;
2314	daa[11*20+10]= 0.0050000;
2315	daa[12*20+0]= 0.0050000;
2316	daa[12*20+1]= 3.2865200;
2317	daa[12*20+2]= 0.2015260;
2318	daa[12*20+3]= 0.0050000;
2319	daa[12*20+4]= 0.0050000;
2320	daa[12*20+5]= 0.0050000;
2321	daa[12*20+6]= 0.0050000;
2322	daa[12*20+7]= 0.0489798;
2323	daa[12*20+8]= 0.0050000;
2324	daa[12*20+9]= 17.3064000;
2325	daa[12*20+10]= 11.3839000;
2326	daa[12*20+11]= 4.0956400;
2327	daa[13*20+0]= 0.5979230;
2328	daa[13*20+1]= 0.0050000;
2329	daa[13*20+2]= 0.0050000;
2330	daa[13*20+3]= 0.0050000;
2331	daa[13*20+4]= 0.3629590;
2332	daa[13*20+5]= 0.0050000;
2333	daa[13*20+6]= 0.0050000;
2334	daa[13*20+7]= 0.0050000;
2335	daa[13*20+8]= 0.0050000;
2336	daa[13*20+9]= 1.4828800;
2337	daa[13*20+10]= 7.4878100;
2338	daa[13*20+11]= 0.0050000;
2339	daa[13*20+12]= 0.0050000;
2340	daa[14*20+0]= 1.0098100;
2341	daa[14*20+1]= 0.4047230;
2342	daa[14*20+2]= 0.3448480;
2343	daa[14*20+3]= 0.0050000;
2344	daa[14*20+4]= 0.0050000;
2345	daa[14*20+5]= 3.0450200;
2346	daa[14*20+6]= 0.0050000;
2347	daa[14*20+7]= 0.0050000;
2348	daa[14*20+8]= 13.9444000;
2349	daa[14*20+9]= 0.0050000;
2350	daa[14*20+10]= 9.8309500;
2351	daa[14*20+11]= 0.1119280;
2352	daa[14*20+12]= 0.0050000;
2353	daa[14*20+13]= 0.0342252;
2354	daa[15*20+0]= 8.5942000;
2355	daa[15*20+1]= 8.3502400;
2356	daa[15*20+2]= 14.5699000;
2357	daa[15*20+3]= 0.4278810;
2358	daa[15*20+4]= 1.1219500;
2359	daa[15*20+5]= 0.1602400;
2360	daa[15*20+6]= 0.0050000;
2361	daa[15*20+7]= 6.2796600;
2362	daa[15*20+8]= 0.7251570;
2363	daa[15*20+9]= 0.7400910;
2364	daa[15*20+10]= 6.1439600;
2365	daa[15*20+11]= 0.0050000;
2366	daa[15*20+12]= 0.3925750;
2367	daa[15*20+13]= 4.2793900;
2368	daa[15*20+14]= 14.2490000;
2369	daa[16*20+0]= 24.1422000;
2370	daa[16*20+1]= 0.9282030;
2371	daa[16*20+2]= 4.5420600;
2372	daa[16*20+3]= 0.6303950;
2373	daa[16*20+4]= 0.0050000;
2374	daa[16*20+5]= 0.2030910;
2375	daa[16*20+6]= 0.4587430;
2376	daa[16*20+7]= 0.0489798;
2377	daa[16*20+8]= 0.9595600;
2378	daa[16*20+9]= 9.3634500;
2379	daa[16*20+10]= 0.0050000;
2380	daa[16*20+11]= 4.0480200;
2381	daa[16*20+12]= 7.4131300;
2382	daa[16*20+13]= 0.1145120;
2383	daa[16*20+14]= 4.3370100;
2384	daa[16*20+15]= 6.3407900;
2385	daa[17*20+0]= 0.0050000;
2386	daa[17*20+1]= 5.9656400;
2387	daa[17*20+2]= 0.0050000;
2388	daa[17*20+3]= 0.0050000;
2389	daa[17*20+4]= 5.4989400;
2390	daa[17*20+5]= 0.0443298;
2391	daa[17*20+6]= 0.0050000;
2392	daa[17*20+7]= 2.8258000;
2393	daa[17*20+8]= 0.0050000;
2394	daa[17*20+9]= 0.0050000;
2395	daa[17*20+10]= 1.3703100;
2396	daa[17*20+11]= 0.0050000;
2397	daa[17*20+12]= 0.0050000;
2398	daa[17*20+13]= 0.0050000;
2399	daa[17*20+14]= 0.0050000;
2400	daa[17*20+15]= 1.1015600;
2401	daa[17*20+16]= 0.0050000;
2402	daa[18*20+0]= 0.0050000;
2403	daa[18*20+1]= 0.0050000;
2404	daa[18*20+2]= 5.0647500;
2405	daa[18*20+3]= 2.2815400;
2406	daa[18*20+4]= 8.3483500;
2407	daa[18*20+5]= 0.0050000;
2408	daa[18*20+6]= 0.0050000;
2409	daa[18*20+7]= 0.0050000;
2410	daa[18*20+8]= 47.4889000;
2411	daa[18*20+9]= 0.1145120;
2412	daa[18*20+10]= 0.0050000;
2413	daa[18*20+11]= 0.0050000;
2414	daa[18*20+12]= 0.5791980;
2415	daa[18*20+13]= 4.1272800;
2416	daa[18*20+14]= 0.0050000;
2417	daa[18*20+15]= 0.9331420;
2418	daa[18*20+16]= 0.4906080;
2419	daa[18*20+17]= 0.0050000;
2420	daa[19*20+0]= 24.8094000;
2421	daa[19*20+1]= 0.2794250;
2422	daa[19*20+2]= 0.0744808;
2423	daa[19*20+3]= 2.9178600;
2424	daa[19*20+4]= 0.0050000;
2425	daa[19*20+5]= 0.0050000;
2426	daa[19*20+6]= 2.1995200;
2427	daa[19*20+7]= 2.7962200;
2428	daa[19*20+8]= 0.8274790;
2429	daa[19*20+9]= 24.8231000;
2430	daa[19*20+10]= 2.9534400;
2431	daa[19*20+11]= 0.1280650;
2432	daa[19*20+12]= 14.7683000;
2433	daa[19*20+13]= 2.2800000;
2434	daa[19*20+14]= 0.0050000;
2435	daa[19*20+15]= 0.8626370;
2436	daa[19*20+16]= 0.0050000;
2437	daa[19*20+17]= 0.0050000;
2438	daa[19*20+18]= 1.3548200;
2439
2440	f[0]= 0.038;
2441	f[1]= 0.057;
2442	f[2]= 0.089;
2443	f[3]= 0.034;
2444	f[4]= 0.024;
2445	f[5]= 0.044;
2446	f[6]= 0.062;
2447	f[7]= 0.084;
2448	f[8]= 0.016;
2449	f[9]= 0.098;
2450	f[10]= 0.058;
2451	f[11]= 0.064;
2452	f[12]= 0.016;
2453	f[13]= 0.042;
2454	f[14]= 0.046;
2455	f[15]= 0.055;
2456	f[16]= 0.081;
2457	f[17]= 0.020;
2458	f[18]= 0.021;
2459	f[19]= 0.051;
2460	}
2461	break;
2462	case JTTDCMUT:
2463	{
2464	daa[1*20+0]= 0.531678;
2465	daa[2*20+0]= 0.557967;
2466	daa[2*20+1]= 0.451095;
2467	daa[3*20+0]= 0.827445;
2468	daa[3*20+1]= 0.154899;
2469	daa[3*20+2]= 5.549530;
2470	daa[4*20+0]= 0.574478;
2471	daa[4*20+1]= 1.019843;
2472	daa[4*20+2]= 0.313311;
2473	daa[4*20+3]= 0.105625;
2474	daa[5*20+0]= 0.556725;
2475	daa[5*20+1]= 3.021995;
2476	daa[5*20+2]= 0.768834;
2477	daa[5*20+3]= 0.521646;
2478	daa[5*20+4]= 0.091304;
2479	daa[6*20+0]= 1.066681;
2480	daa[6*20+1]= 0.318483;
2481	daa[6*20+2]= 0.578115;
2482	daa[6*20+3]= 7.766557;
2483	daa[6*20+4]= 0.053907;
2484	daa[6*20+5]= 3.417706;
2485	daa[7*20+0]= 1.740159;
2486	daa[7*20+1]= 1.359652;
2487	daa[7*20+2]= 0.773313;
2488	daa[7*20+3]= 1.272434;
2489	daa[7*20+4]= 0.546389;
2490	daa[7*20+5]= 0.231294;
2491	daa[7*20+6]= 1.115632;
2492	daa[8*20+0]= 0.219970;
2493	daa[8*20+1]= 3.210671;
2494	daa[8*20+2]= 4.025778;
2495	daa[8*20+3]= 1.032342;
2496	daa[8*20+4]= 0.724998;
2497	daa[8*20+5]= 5.684080;
2498	daa[8*20+6]= 0.243768;
2499	daa[8*20+7]= 0.201696;
2500	daa[9*20+0]= 0.361684;
2501	daa[9*20+1]= 0.239195;
2502	daa[9*20+2]= 0.491003;
2503	daa[9*20+3]= 0.115968;
2504	daa[9*20+4]= 0.150559;
2505	daa[9*20+5]= 0.078270;
2506	daa[9*20+6]= 0.111773;
2507	daa[9*20+7]= 0.053769;
2508	daa[9*20+8]= 0.181788;
2509	daa[10*20+0]= 0.310007;
2510	daa[10*20+1]= 0.372261;
2511	daa[10*20+2]= 0.137289;
2512	daa[10*20+3]= 0.061486;
2513	daa[10*20+4]= 0.164593;
2514	daa[10*20+5]= 0.709004;
2515	daa[10*20+6]= 0.097485;
2516	daa[10*20+7]= 0.069492;
2517	daa[10*20+8]= 0.540571;
2518	daa[10*20+9]= 2.335139;
2519	daa[11*20+0]= 0.369437;
2520	daa[11*20+1]= 6.529255;
2521	daa[11*20+2]= 2.529517;
2522	daa[11*20+3]= 0.282466;
2523	daa[11*20+4]= 0.049009;
2524	daa[11*20+5]= 2.966732;
2525	daa[11*20+6]= 1.731684;
2526	daa[11*20+7]= 0.269840;
2527	daa[11*20+8]= 0.525096;
2528	daa[11*20+9]= 0.202562;
2529	daa[11*20+10]= 0.146481;
2530	daa[12*20+0]= 0.469395;
2531	daa[12*20+1]= 0.431045;
2532	daa[12*20+2]= 0.330720;
2533	daa[12*20+3]= 0.190001;
2534	daa[12*20+4]= 0.409202;
2535	daa[12*20+5]= 0.456901;
2536	daa[12*20+6]= 0.175084;
2537	daa[12*20+7]= 0.130379;
2538	daa[12*20+8]= 0.329660;
2539	daa[12*20+9]= 4.831666;
2540	daa[12*20+10]= 3.856906;
2541	daa[12*20+11]= 0.624581;
2542	daa[13*20+0]= 0.138293;
2543	daa[13*20+1]= 0.065314;
2544	daa[13*20+2]= 0.073481;
2545	daa[13*20+3]= 0.032522;
2546	daa[13*20+4]= 0.678335;
2547	daa[13*20+5]= 0.045683;
2548	daa[13*20+6]= 0.043829;
2549	daa[13*20+7]= 0.050212;
2550	daa[13*20+8]= 0.453428;
2551	daa[13*20+9]= 0.777090;
2552	daa[13*20+10]= 2.500294;
2553	daa[13*20+11]= 0.024521;
2554	daa[13*20+12]= 0.436181;
2555	daa[14*20+0]= 1.959599;
2556	daa[14*20+1]= 0.710489;
2557	daa[14*20+2]= 0.121804;
2558	daa[14*20+3]= 0.127164;
2559	daa[14*20+4]= 0.123653;
2560	daa[14*20+5]= 1.608126;
2561	daa[14*20+6]= 0.191994;
2562	daa[14*20+7]= 0.208081;
2563	daa[14*20+8]= 1.141961;
2564	daa[14*20+9]= 0.098580;
2565	daa[14*20+10]= 1.060504;
2566	daa[14*20+11]= 0.216345;
2567	daa[14*20+12]= 0.164215;
2568	daa[14*20+13]= 0.148483;
2569	daa[15*20+0]= 3.887095;
2570	daa[15*20+1]= 1.001551;
2571	daa[15*20+2]= 5.057964;
2572	daa[15*20+3]= 0.589268;
2573	daa[15*20+4]= 2.155331;
2574	daa[15*20+5]= 0.548807;
2575	daa[15*20+6]= 0.312449;
2576	daa[15*20+7]= 1.874296;
2577	daa[15*20+8]= 0.743458;
2578	daa[15*20+9]= 0.405119;
2579	daa[15*20+10]= 0.592511;
2580	daa[15*20+11]= 0.474478;
2581	daa[15*20+12]= 0.285564;
2582	daa[15*20+13]= 0.943971;
2583	daa[15*20+14]= 2.788406;
2584	daa[16*20+0]= 4.582565;
2585	daa[16*20+1]= 0.650282;
2586	daa[16*20+2]= 2.351311;
2587	daa[16*20+3]= 0.425159;
2588	daa[16*20+4]= 0.469823;
2589	daa[16*20+5]= 0.523825;
2590	daa[16*20+6]= 0.331584;
2591	daa[16*20+7]= 0.316862;
2592	daa[16*20+8]= 0.477355;
2593	daa[16*20+9]= 2.553806;
2594	daa[16*20+10]= 0.272514;
2595	daa[16*20+11]= 0.965641;
2596	daa[16*20+12]= 2.114728;
2597	daa[16*20+13]= 0.138904;
2598	daa[16*20+14]= 1.176961;
2599	daa[16*20+15]= 4.777647;
2600	daa[17*20+0]= 0.084329;
2601	daa[17*20+1]= 1.257961;
2602	daa[17*20+2]= 0.027700;
2603	daa[17*20+3]= 0.057466;
2604	daa[17*20+4]= 1.104181;
2605	daa[17*20+5]= 0.172206;
2606	daa[17*20+6]= 0.114381;
2607	daa[17*20+7]= 0.544180;
2608	daa[17*20+8]= 0.128193;
2609	daa[17*20+9]= 0.134510;
2610	daa[17*20+10]= 0.530324;
2611	daa[17*20+11]= 0.089134;
2612	daa[17*20+12]= 0.201334;
2613	daa[17*20+13]= 0.537922;
2614	daa[17*20+14]= 0.069965;
2615	daa[17*20+15]= 0.310927;
2616	daa[17*20+16]= 0.080556;
2617	daa[18*20+0]= 0.139492;
2618	daa[18*20+1]= 0.235601;
2619	daa[18*20+2]= 0.700693;
2620	daa[18*20+3]= 0.453952;
2621	daa[18*20+4]= 2.114852;
2622	daa[18*20+5]= 0.254745;
2623	daa[18*20+6]= 0.063452;
2624	daa[18*20+7]= 0.052500;
2625	daa[18*20+8]= 5.848400;
2626	daa[18*20+9]= 0.303445;
2627	daa[18*20+10]= 0.241094;
2628	daa[18*20+11]= 0.087904;
2629	daa[18*20+12]= 0.189870;
2630	daa[18*20+13]= 5.484236;
2631	daa[18*20+14]= 0.113850;
2632	daa[18*20+15]= 0.628608;
2633	daa[18*20+16]= 0.201094;
2634	daa[18*20+17]= 0.747889;
2635	daa[19*20+0]= 2.924161;
2636	daa[19*20+1]= 0.171995;
2637	daa[19*20+2]= 0.164525;
2638	daa[19*20+3]= 0.315261;
2639	daa[19*20+4]= 0.621323;
2640	daa[19*20+5]= 0.179771;
2641	daa[19*20+6]= 0.465271;
2642	daa[19*20+7]= 0.470140;
2643	daa[19*20+8]= 0.121827;
2644	daa[19*20+9]= 9.533943;
2645	daa[19*20+10]= 1.761439;
2646	daa[19*20+11]= 0.124066;
2647	daa[19*20+12]= 3.038533;
2648	daa[19*20+13]= 0.593478;
2649	daa[19*20+14]= 0.211561;
2650	daa[19*20+15]= 0.408532;
2651	daa[19*20+16]= 1.143980;
2652	daa[19*20+17]= 0.239697;
2653	daa[19*20+18]= 0.165473;
2654
2655	f[0]= 0.077;
2656	f[1]= 0.051;
2657	f[2]= 0.043;
2658	f[3]= 0.051;
2659	f[4]= 0.020;
2660	f[5]= 0.041;
2661	f[6]= 0.062;
2662	f[7]= 0.075;
2663	f[8]= 0.023;
2664	f[9]= 0.053;
2665	f[10]= 0.091;
2666	f[11]= 0.059;
2667	f[12]= 0.024;
2668	f[13]= 0.040;
2669	f[14]= 0.051;
2670	f[15]= 0.068;
2671	f[16]= 0.059;
2672	f[17]= 0.014;
2673	f[18]= 0.032;
2674	f[19]= 0.066;
2675	}
2676	break;
2677	case FLU:
2678	{
2679	daa[ 1*20+ 0] = 0.138658765 ;
2680	daa[ 2*20+ 0] = 0.053366579 ;
2681	daa[ 2*20+ 1] = 0.161000889 ;
2682	daa[ 3*20+ 0] = 0.584852306 ;
2683	daa[ 3*20+ 1] = 0.006771843 ;
2684	daa[ 3*20+ 2] = 7.737392871 ;
2685	daa[ 4*20+ 0] = 0.026447095 ;
2686	daa[ 4*20+ 1] = 0.167207008 ;
2687	daa[ 4*20+ 2] = 1.30E-05 ;
2688	daa[ 4*20+ 3] = 1.41E-02 ;
2689	daa[ 5*20+ 0] = 0.353753982 ;
2690	daa[ 5*20+ 1] = 3.292716942 ;
2691	daa[ 5*20+ 2] = 0.530642655 ;
2692	daa[ 5*20+ 3] = 0.145469388 ;
2693	daa[ 5*20+ 4] = 0.002547334 ;
2694	daa[ 6*20+ 0] = 1.484234503 ;
2695	daa[ 6*20+ 1] = 0.124897617 ;
2696	daa[ 6*20+ 2] = 0.061652192 ;
2697	daa[ 6*20+ 3] = 5.370511279 ;
2698	daa[ 6*20+ 4] = 3.91E-11 ;
2699	daa[ 6*20+ 5] = 1.195629122 ;
2700	daa[ 7*20+ 0] = 1.132313122 ;
2701	daa[ 7*20+ 1] = 1.190624465 ;
2702	daa[ 7*20+ 2] = 0.322524648 ;
2703	daa[ 7*20+ 3] = 1.934832784 ;
2704	daa[ 7*20+ 4] = 0.116941459 ;
2705	daa[ 7*20+ 5] = 0.108051341 ;
2706	daa[ 7*20+ 6] = 1.593098825 ;
2707	daa[ 8*20+ 0] = 0.214757862 ;
2708	daa[ 8*20+ 1] = 1.879569938 ;
2709	daa[ 8*20+ 2] = 1.387096032 ;
2710	daa[ 8*20+ 3] = 0.887570549 ;
2711	daa[ 8*20+ 4] = 2.18E-02 ;
2712	daa[ 8*20+ 5] = 5.330313412 ;
2713	daa[ 8*20+ 6] = 0.256491863 ;
2714	daa[ 8*20+ 7] = 0.058774527 ;
2715	daa[ 9*20+ 0] = 0.149926734 ;
2716	daa[ 9*20+ 1] = 0.246117172 ;
2717	daa[ 9*20+ 2] = 0.218571975 ;
2718	daa[ 9*20+ 3] = 0.014085917 ;
2719	daa[ 9*20+ 4] = 0.001112158 ;
2720	daa[ 9*20+ 5] = 0.02883995 ;
2721	daa[ 9*20+ 6] = 1.42E-02 ;
2722	daa[ 9*20+ 7] = 1.63E-05 ;
2723	daa[ 9*20+ 8] = 0.243190142 ;
2724	daa[10*20+ 0] = 0.023116952 ;
2725	daa[10*20+ 1] = 0.296045557 ;
2726	daa[10*20+ 2] = 8.36E-04 ;
2727	daa[10*20+ 3] = 0.005730682 ;
2728	daa[10*20+ 4] = 0.005613627 ;
2729	daa[10*20+ 5] = 1.020366955 ;
2730	daa[10*20+ 6] = 0.016499536 ;
2731	daa[10*20+ 7] = 0.006516229 ;
2732	daa[10*20+ 8] = 0.321611694 ;
2733	daa[10*20+ 9] = 3.512072282 ;
2734	daa[11*20+ 0] = 0.47433361 ;
2735	daa[11*20+ 1] = 15.30009662 ;
2736	daa[11*20+ 2] = 2.646847965 ;
2737	daa[11*20+ 3] = 0.29004298 ;
2738	daa[11*20+ 4] = 3.83E-06 ;
2739	daa[11*20+ 5] = 2.559587177 ;
2740	daa[11*20+ 6] = 3.881488809 ;
2741	daa[11*20+ 7] = 0.264148929 ;
2742	daa[11*20+ 8] = 0.347302791 ;
2743	daa[11*20+ 9] = 0.227707997 ;
2744	daa[11*20+10] = 0.129223639 ;
2745	daa[12*20+ 0] = 0.058745423 ;
2746	daa[12*20+ 1] = 0.890162346 ;
2747	daa[12*20+ 2] = 0.005251688 ;
2748	daa[12*20+ 3] = 0.041762964 ;
2749	daa[12*20+ 4] = 0.11145731 ;
2750	daa[12*20+ 5] = 0.190259181 ;
2751	daa[12*20+ 6] = 0.313974351 ;
2752	daa[12*20+ 7] = 0.001500467 ;
2753	daa[12*20+ 8] = 0.001273509 ;
2754	daa[12*20+ 9] = 9.017954203 ;
2755	daa[12*20+10] = 6.746936485 ;
2756	daa[12*20+11] = 1.331291619 ;
2757	daa[13*20+ 0] = 0.080490909 ;
2758	daa[13*20+ 1] = 1.61E-02 ;
2759	daa[13*20+ 2] = 8.36E-04 ;
2760	daa[13*20+ 3] = 1.06E-06 ;
2761	daa[13*20+ 4] = 0.104053666 ;
2762	daa[13*20+ 5] = 0.032680657 ;
2763	daa[13*20+ 6] = 0.001003501 ;
2764	daa[13*20+ 7] = 0.001236645 ;
2765	daa[13*20+ 8] = 0.119028506 ;
2766	daa[13*20+ 9] = 1.463357278 ;
2767	daa[13*20+10] = 2.986800036 ;
2768	daa[13*20+11] = 3.20E-01 ;
2769	daa[13*20+12] = 0.279910509 ;
2770	daa[14*20+ 0] = 0.659311478 ;
2771	daa[14*20+ 1] = 0.15402718 ;
2772	daa[14*20+ 2] = 3.64E-02 ;
2773	daa[14*20+ 3] = 0.188539456 ;
2774	daa[14*20+ 4] = 1.59E-13 ;
2775	daa[14*20+ 5] = 0.712769599 ;
2776	daa[14*20+ 6] = 0.319558828 ;
2777	daa[14*20+ 7] = 0.038631761 ;
2778	daa[14*20+ 8] = 0.924466914 ;
2779	daa[14*20+ 9] = 0.080543327 ;
2780	daa[14*20+10] = 0.634308521 ;
2781	daa[14*20+11] = 0.195750632 ;
2782	daa[14*20+12] = 5.69E-02 ;
2783	daa[14*20+13] = 0.00713243 ;
2784	daa[15*20+ 0] = 3.011344519 ;
2785	daa[15*20+ 1] = 0.95013841 ;
2786	daa[15*20+ 2] = 3.881310531 ;
2787	daa[15*20+ 3] = 0.338372183 ;
2788	daa[15*20+ 4] = 0.336263345 ;
2789	daa[15*20+ 5] = 0.487822499 ;
2790	daa[15*20+ 6] = 0.307140298 ;
2791	daa[15*20+ 7] = 1.585646577 ;
2792	daa[15*20+ 8] = 0.58070425 ;
2793	daa[15*20+ 9] = 0.290381075 ;
2794	daa[15*20+10] = 0.570766693 ;
2795	daa[15*20+11] = 0.283807672 ;
2796	daa[15*20+12] = 0.007026588 ;
2797	daa[15*20+13] = 0.99668567 ;
2798	daa[15*20+14] = 2.087385344 ;
2799	daa[16*20+ 0] = 5.418298175 ;
2800	daa[16*20+ 1] = 0.183076905 ;
2801	daa[16*20+ 2] = 2.140332316 ;
2802	daa[16*20+ 3] = 0.135481233 ;
2803	daa[16*20+ 4] = 0.011975266 ;
2804	daa[16*20+ 5] = 0.602340963 ;
2805	daa[16*20+ 6] = 0.280124895 ;
2806	daa[16*20+ 7] = 0.01880803 ;
2807	daa[16*20+ 8] = 0.368713573 ;
2808	daa[16*20+ 9] = 2.904052286 ;
2809	daa[16*20+10] = 0.044926357 ;
2810	daa[16*20+11] = 1.5269642 ;
2811	daa[16*20+12] = 2.031511321 ;
2812	daa[16*20+13] = 0.000134906 ;
2813	daa[16*20+14] = 0.542251094 ;
2814	daa[16*20+15] = 2.206859934 ;
2815	daa[17*20+ 0] = 1.96E-01 ;
2816	daa[17*20+ 1] = 1.369429408 ;
2817	daa[17*20+ 2] = 5.36E-04 ;
2818	daa[17*20+ 3] = 1.49E-05 ;
2819	daa[17*20+ 4] = 0.09410668 ;
2820	daa[17*20+ 5] = 4.40E-02 ;
2821	daa[17*20+ 6] = 0.155245492 ;
2822	daa[17*20+ 7] = 0.196486447 ;
2823	daa[17*20+ 8] = 2.24E-02 ;
2824	daa[17*20+ 9] = 0.03213215 ;
2825	daa[17*20+10] = 0.431277663 ;
2826	daa[17*20+11] = 4.98E-05 ;
2827	daa[17*20+12] = 0.070460039 ;
2828	daa[17*20+13] = 0.814753094 ;
2829	daa[17*20+14] = 0.000431021 ;
2830	daa[17*20+15] = 0.099835753 ;
2831	daa[17*20+16] = 0.207066206 ;
2832	daa[18*20+ 0] = 0.018289288 ;
2833	daa[18*20+ 1] = 0.099855497 ;
2834	daa[18*20+ 2] = 0.373101927 ;
2835	daa[18*20+ 3] = 0.525398543 ;
2836	daa[18*20+ 4] = 0.601692431 ;
2837	daa[18*20+ 5] = 0.072205935 ;
2838	daa[18*20+ 6] = 0.10409287 ;
2839	daa[18*20+ 7] = 0.074814997 ;
2840	daa[18*20+ 8] = 6.448954446 ;
2841	daa[18*20+ 9] = 0.273934263 ;
2842	daa[18*20+10] = 0.340058468 ;
2843	daa[18*20+11] = 0.012416222 ;
2844	daa[18*20+12] = 0.874272175 ;
2845	daa[18*20+13] = 5.393924245 ;
2846	daa[18*20+14] = 1.82E-04 ;
2847	daa[18*20+15] = 0.39255224 ;
2848	daa[18*20+16] = 0.12489802 ;
2849	daa[18*20+17] = 0.42775543 ;
2850	daa[19*20+ 0] = 3.53200527 ;
2851	daa[19*20+ 1] = 0.103964386 ;
2852	daa[19*20+ 2] = 0.010257517 ;
2853	daa[19*20+ 3] = 0.297123975 ;
2854	daa[19*20+ 4] = 0.054904564 ;
2855	daa[19*20+ 5] = 0.406697814 ;
2856	daa[19*20+ 6] = 0.285047948 ;
2857	daa[19*20+ 7] = 0.337229619 ;
2858	daa[19*20+ 8] = 0.098631355 ;
2859	daa[19*20+ 9] = 14.39405219 ;
2860	daa[19*20+10] = 0.890598579 ;
2861	daa[19*20+11] = 0.07312793 ;
2862	daa[19*20+12] = 4.904842235 ;
2863	daa[19*20+13] = 0.592587985 ;
2864	daa[19*20+14] = 0.058971975 ;
2865	daa[19*20+15] = 0.088256423 ;
2866	daa[19*20+16] = 0.654109108 ;
2867	daa[19*20+17] = 0.256900461 ;
2868	daa[19*20+18] = 0.167581647 ;
2869
2870
2871
2872	f[0] = 0.0471 ;
2873	f[1] = 0.0509 ;
2874	f[2] = 0.0742 ;
2875	f[3] = 0.0479 ;
2876	f[4] = 0.0250 ;
2877	f[5] = 0.0333 ;
2878	f[6] = 0.0546 ;
2879	f[7] = 0.0764 ;
2880	f[8] = 0.0200 ;
2881	f[9] = 0.0671 ;
2882	f[10] = 0.0715 ;
2883	f[11] = 0.0568 ;
2884	f[12] = 0.0181 ;
2885	f[13] = 0.0305 ;
2886	f[14] = 0.0507 ;
2887	f[15] = 0.0884 ;
2888	f[16] = 0.0743 ;
2889	f[17] = 0.0185 ;
2890	f[18] = 0.0315 ;
2891	f[19] = 0.0632 ;
2892	}
2893	break;
2894	case LG4:
2895	case LG4X:
2896	{
2897	double
2898	rates[4][190] =
2899	{
2900	{
2901	0.269343
2902	, 0.254612, 0.150988
2903	, 0.236821, 0.031863, 0.659648
2904	, 2.506547, 0.938594, 0.975736, 0.175533
2905	, 0.359080, 0.348288, 0.697708, 0.086573, 0.095967
2906	, 0.304674, 0.156000, 0.377704, 0.449140, 0.064706, 4.342595
2907	, 1.692015, 0.286638, 0.565095, 0.380358, 0.617945, 0.202058, 0.264342
2908	, 0.251974, 0.921633, 1.267609, 0.309692, 0.390429, 2.344059, 0.217750, 0.104842
2909	, 1.085220, 0.325624, 0.818658, 0.037814, 1.144150, 0.534567, 0.222793, 0.062682, 0.567431
2910	, 0.676353, 0.602366, 0.217027, 0.007533, 1.595775, 0.671143, 0.158424, 0.070463, 0.764255, 8.226528
2911	, 0.179155, 0.971338, 1.343718, 0.133744, 0.122468, 0.983857, 0.994128, 0.220916, 0.410581, 0.387487, 0.181110
2912	, 1.636817, 0.515217, 0.670461, 0.071252, 1.534848, 5.288642, 0.255628, 0.094198, 0.257229, 25.667158, 6.819689, 1.591212
2913	, 0.235498, 0.123932, 0.099793, 0.030425, 0.897279, 0.112229, 0.022529, 0.047488, 0.762914, 1.344259, 0.865691, 0.038921, 2.030833
2914	, 1.265605, 0.040163, 0.173354, 0.027579, 0.259961, 0.580374, 0.088041, 0.145595, 0.143676, 0.298859, 1.020117, 0.000714, 0.190019, 0.093964
2915	, 5.368405, 0.470952, 5.267140, 0.780505, 4.986071, 0.890554, 0.377949, 1.755515, 0.786352, 0.527246, 0.667783, 0.659948, 0.731921, 0.837669, 1.355630
2916	, 1.539394, 0.326789, 1.688169, 0.283738, 1.389282, 0.329821, 0.231770, 0.117017, 0.449977, 3.531600, 0.721586, 0.497588, 2.691697, 0.152088, 0.698040, 16.321298
2917	, 0.140944, 0.375611, 0.025163, 0.002757, 0.801456, 0.257253, 0.103678, 0.132995, 0.345834, 0.377156, 0.839647, 0.176970, 0.505682, 1.670170, 0.091298, 0.210096, 0.013165
2918	, 0.199836, 0.146857, 0.806275, 0.234246, 1.436970, 0.319669, 0.010076, 0.036859, 3.503317, 0.598632, 0.738969, 0.154436, 0.579000, 4.245524, 0.074524, 0.454195, 0.232913, 1.178490
2919	, 9.435529, 0.285934, 0.395670, 0.130890, 6.097263, 0.516259, 0.503665, 0.222960, 0.149143, 13.666175, 2.988174, 0.162725, 5.973826, 0.843416, 0.597394, 0.701149, 4.680002, 0.300085, 0.416262
2920	},
2921	{
2922	0.133720
2923	, 0.337212, 0.749052
2924	, 0.110918, 0.105087, 4.773487
2925	, 3.993460, 0.188305, 1.590332, 0.304942
2926	, 0.412075, 2.585774, 1.906884, 0.438367, 0.242076
2927	, 0.435295, 0.198278, 0.296366, 7.470333, 0.008443, 3.295515
2928	, 7.837540, 0.164607, 0.431724, 0.153850, 1.799716, 0.269744, 0.242866
2929	, 0.203872, 2.130334, 9.374479, 1.080878, 0.152458, 12.299133, 0.279589, 0.089714
2930	, 0.039718, 0.024553, 0.135254, 0.014979, 0.147498, 0.033964, 0.005585, 0.007248, 0.022746
2931	, 0.075784, 0.080091, 0.084971, 0.014128, 0.308347, 0.500836, 0.022833, 0.022999, 0.161270, 1.511682
2932	, 0.177662, 10.373708, 1.036721, 0.038303, 0.043030, 2.181033, 0.321165, 0.103050, 0.459502, 0.021215, 0.078395
2933	, 0.420784, 0.192765, 0.329545, 0.008331, 0.883142, 1.403324, 0.168673, 0.160728, 0.612573, 1.520889, 7.763266, 0.307903
2934	, 0.071268, 0.019652, 0.088753, 0.013547, 0.566609, 0.071878, 0.020050, 0.041022, 0.625361, 0.382806, 1.763059, 0.044644, 1.551911
2935	, 0.959127, 1.496585, 0.377794, 0.332010, 0.318192, 1.386970, 0.915904, 0.224255, 2.611479, 0.029351, 0.068250, 1.542356, 0.047525, 0.182715
2936	, 11.721512, 0.359408, 2.399158, 0.219464, 9.104192, 0.767563, 0.235229, 3.621219, 0.971955, 0.033780, 0.043035, 0.236929, 0.319964, 0.124977, 0.840651
2937	, 2.847068, 0.218463, 1.855386, 0.109808, 4.347048, 0.765848, 0.164569, 0.312024, 0.231569, 0.356327, 0.159597, 0.403210, 1.135162, 0.106903, 0.269190, 9.816481
2938	, 0.030203, 0.387292, 0.118878, 0.067287, 0.190240, 0.122113, 0.007023, 0.137411, 0.585141, 0.020634, 0.228824, 0.000122, 0.474862, 3.135128, 0.030313, 0.093830, 0.119152
2939	, 0.067183, 0.130101, 0.348730, 0.061798, 0.301198, 0.095382, 0.095764, 0.044628, 2.107384, 0.046105, 0.100117, 0.017073, 0.192383, 8.367641, 0.000937, 0.137416, 0.044722, 4.179782
2940	, 0.679398, 0.041567, 0.092408, 0.023701, 1.271187, 0.115566, 0.055277, 0.086988, 0.060779, 8.235167, 0.609420, 0.061764, 0.581962, 0.184187, 0.080246, 0.098033, 1.438350, 0.023439, 0.039124
2941	},
2942	{
2943	0.421017
2944	, 0.316236, 0.693340
2945	, 0.285984, 0.059926, 6.158219
2946	, 4.034031, 1.357707, 0.708088, 0.063669
2947	, 0.886972, 2.791622, 1.701830, 0.484347, 0.414286
2948	, 0.760525, 0.233051, 0.378723, 4.032667, 0.081977, 4.940411
2949	, 0.754103, 0.402894, 2.227443, 1.102689, 0.416576, 0.459376, 0.508409
2950	, 0.571422, 2.319453, 5.579973, 0.885376, 1.439275, 4.101979, 0.576745, 0.428799
2951	, 0.162152, 0.085229, 0.095692, 0.006129, 0.490937, 0.104843, 0.045514, 0.004705, 0.098934
2952	, 0.308006, 0.287051, 0.056994, 0.007102, 0.958988, 0.578990, 0.067119, 0.024403, 0.342983, 3.805528
2953	, 0.390161, 7.663209, 1.663641, 0.105129, 0.135029, 3.364474, 0.652618, 0.457702, 0.823674, 0.129858, 0.145630
2954	, 1.042298, 0.364551, 0.293222, 0.037983, 1.486520, 1.681752, 0.192414, 0.070498, 0.222626, 4.529623, 4.781730, 0.665308
2955	, 0.362476, 0.073439, 0.129245, 0.020078, 1.992483, 0.114549, 0.023272, 0.064490, 1.491794, 1.113437, 2.132006, 0.041677, 1.928654
2956	, 1.755491, 0.087050, 0.099325, 0.163817, 0.242851, 0.322939, 0.062943, 0.198698, 0.192904, 0.062948, 0.180283, 0.059655, 0.129323, 0.065778
2957	, 3.975060, 0.893398, 5.496314, 1.397313, 3.575120, 1.385297, 0.576191, 1.733288, 1.021255, 0.065131, 0.129115, 0.600308, 0.387276, 0.446001, 1.298493
2958	, 2.565079, 0.534056, 2.143993, 0.411388, 2.279084, 0.893006, 0.528209, 0.135731, 0.518741, 0.972662, 0.280700, 0.890086, 1.828755, 0.189028, 0.563778, 7.788147
2959	, 0.283631, 0.497926, 0.075454, 0.043794, 1.335322, 0.308605, 0.140137, 0.150797, 1.409726, 0.119868, 0.818331, 0.080591, 1.066017, 3.754687, 0.073415, 0.435046, 0.197272
2960	, 0.242513, 0.199157, 0.472207, 0.085937, 2.039787, 0.262751, 0.084578, 0.032247, 7.762326, 0.153966, 0.299828, 0.117255, 0.438215, 14.506235, 0.089180, 0.352766, 0.215417, 5.054245
2961	, 2.795818, 0.107130, 0.060909, 0.029724, 2.986426, 0.197267, 0.196977, 0.044327, 0.116751, 7.144311, 1.848622, 0.118020, 1.999696, 0.705747, 0.272763, 0.096935, 1.820982, 0.217007, 0.172975
2962	},
2963	{
2964	0.576160
2965	, 0.567606, 0.498643
2966	, 0.824359, 0.050698, 3.301401
2967	, 0.822724, 4.529235, 1.291808, 0.101930
2968	, 1.254238, 2.169809, 1.427980, 0.449474, 0.868679
2969	, 1.218615, 0.154502, 0.411471, 3.172277, 0.050239, 2.138661
2970	, 1.803443, 0.604673, 2.125496, 1.276384, 1.598679, 0.502653, 0.479490
2971	, 0.516862, 2.874265, 4.845769, 0.719673, 3.825677, 4.040275, 0.292773, 0.596643
2972	, 0.180898, 0.444586, 0.550969, 0.023542, 2.349573, 0.370160, 0.142187, 0.016618, 0.500788
2973	, 0.452099, 0.866322, 0.201033, 0.026731, 2.813990, 1.645178, 0.135556, 0.072152, 1.168817, 5.696116
2974	, 0.664186, 2.902886, 2.101971, 0.127988, 0.200218, 2.505933, 0.759509, 0.333569, 0.623100, 0.547454, 0.363656
2975	, 0.864415, 0.835049, 0.632649, 0.079201, 2.105931, 1.633544, 0.216462, 0.252419, 0.665406, 7.994105, 11.751178, 1.096842
2976	, 0.324478, 0.208947, 0.280339, 0.041683, 4.788477, 0.107022, 0.067711, 0.171320, 3.324779, 2.965328, 5.133843, 0.084856, 4.042591
2977	, 1.073043, 0.173826, 0.041985, 0.270336, 0.121299, 0.351384, 0.228565, 0.225318, 0.376089, 0.058027, 0.390354, 0.214230, 0.058954, 0.126299
2978	, 3.837562, 0.884342, 4.571911, 0.942751, 6.592827, 1.080063, 0.465397, 3.137614, 1.119667, 0.362516, 0.602355, 0.716940, 0.506796, 1.444484, 1.432558
2979	, 2.106026, 0.750016, 2.323325, 0.335915, 1.654673, 1.194017, 0.617231, 0.318671, 0.801030, 4.455842, 0.580191, 1.384210, 3.522468, 0.473128, 0.432718, 5.716300
2980	, 0.163720, 0.818102, 0.072322, 0.068275, 3.305436, 0.373790, 0.054323, 0.476587, 1.100360, 0.392946, 1.703323, 0.085720, 1.725516, 5.436253, 0.053108, 0.498594, 0.231832
2981	, 0.241167, 0.302440, 1.055095, 0.246940, 9.741942, 0.249895, 0.129973, 0.052363, 11.542498, 1.047449, 1.319667, 0.139770, 1.330225, 26.562270, 0.046986, 0.737653, 0.313460, 5.165098
2982	, 1.824586, 0.435795, 0.179086, 0.091739, 3.609570, 0.649507, 0.656681, 0.225234, 0.473437, 19.897252, 3.001995, 0.452926, 3.929598, 1.692159, 0.370204, 0.373501, 3.329822, 0.326593, 0.860743
2983	}
2984	};
2985
2986	double
2987	freqs[4][20] =
2988	{{0.082276,0.055172,0.043853,0.053484,0.018957,0.028152,0.046679,0.157817,0.033297,0.028284,0.054284,0.025275,0.023665,0.041874,0.063071,0.066501,0.065424,0.023837,0.038633,0.049465},
2989	{0.120900,0.036460,0.026510,0.040410,0.015980,0.021132,0.025191,0.036369,0.015884,0.111029,0.162852,0.024820,0.028023,0.074058,0.012065,0.041963,0.039072,0.012666,0.040478,0.114137},
2990	{0.072639,0.051691,0.038642,0.055580,0.009829,0.031374,0.048731,0.065283,0.023791,0.086640,0.120847,0.052177,0.026728,0.032589,0.039238,0.046748,0.053361,0.008024,0.037426,0.098662},
2991	{0.104843,0.078835,0.043513,0.090498,0.002924,0.066163,0.151640,0.038843,0.022556,0.018383,0.038687,0.104462,0.010166,0.009089,0.066950,0.053667,0.049486,0.004409,0.012924,0.031963}};
2992
2993	int
2994	i,
2995	j,
2996	r = 0;
2997
2998	for(i = 1; i < 20; i++)
2999	for(j = 0; j < i; j++)
3000	{
3001	daa[i * 20 + j] = rates[lg4_index][r];
3002	r++;
3003	}
3004
3005	assert(r == 190);
3006
3007	for(i = 0; i < 20; i++)
3008	f[i] = freqs[lg4_index][i];
3009
3010	}
3011	break;
3012	case DUMMY:
3013	{
3014	double
3015	rates[190] = {10.7,
3016	0.2, 3.7,
3017	4.3, 0.2, 1024.8,
3018	26.1, 28.2, 46.5, 0.2,
3019	0.2, 316.9, 32.4, 12.6, 13.7,
3020	23.0, 0.2, 26.6, 814.8, 0.2, 159.5,
3021	76.3, 9.6, 39.3, 33.1, 23.5, 2.6, 56.8,
3022	0.2, 212.7, 294.3, 59.4, 131.9, 604.6, 5.1, 1.5,
3023	41.9, 0.7, 15.2, 0.2, 0.2, 0.2, 0.2, 1.4, 0.2,
3024	4.8, 4.9, 0.2, 0.2, 19.9, 25.3, 0.2, 0.2, 11.0, 133.7,
3025	1.7, 17.2, 331.6, 5.5, 0.2, 164.7, 237.8, 5.7, 12.7, 0.2, 0.2,
3026	124.0, 0.2, 0.2, 0.2, 0.2, 6.9, 1.5, 0.5, 1.2, 322.3, 416.2, 36.8,
3027	2.5, 0.2, 0.4, 0.2, 77.4, 0.2, 0.2, 0.7, 15.4, 44.1, 277.9, 0.2, 8.3,
3028	41.3, 8.3, 0.2, 2.5, 0.2, 75.8, 0.2, 0.4, 75.7, 2.6, 52.1, 3.9, 1.3, 11.1,
3029	307.4, 7.1, 491.3, 15.0, 437.3, 25.3, 7.4, 105.9, 56.4, 2.4, 81.0, 24.2, 6.6, 122.8, 327.1,
3030	782.7, 0.4, 94.0, 19.0, 24.9, 12.5, 1.6, 0.2, 9.6, 360.6, 16.6, 48.8, 651.4, 3.9, 64.7, 455.7,
3031	0.2, 18.3, 0.2, 0.2, 133.5, 4.3, 0.2, 6.5, 1.2, 0.2, 10.7, 0.2, 0.6, 2.0, 0.5, 4.2, 0.2,
3032	0.2, 1.0, 85.7, 29.4, 994.7, 6.6, 0.2, 0.2, 2096.0, 6.2, 15.5, 1.6, 6.5, 502.9, 11.5, 63.6, 4.3, 10.1,
3033	565.4, 0.2, 1.7, 14.9, 20.9, 0.2, 13.5, 13.5, 0.2, 1987.0, 74.0, 1.7, 716.8, 5.6, 2.7, 0.9, 246.3, 3.0, 0.2};
3034
3035	double
3036	freqs[20] = { 0.066446, 0.017604, 0.043105, 0.017760, 0.005969, 0.024329, 0.023622, 0.052890, 0.026973, 0.088543,
3037	0.162813, 0.025336, 0.062589, 0.061567, 0.053608, 0.074271, 0.087828, 0.027617, 0.034022, 0.043108};
3038
3039	int
3040	i, j, r = 0;
3041
3042	for(i = 1; i < 20; i++)
3043	for(j = 0; j < i; j++)
3044	{
3045	daa[i * 20 + j] = rates[r];
3046	r++;
3047	}
3048
3049	assert(r == 190);
3050
3051	for(i = 0; i < 20; i++)
3052	f[i] = freqs[i];
3053	}
3054	break;
3055	case DUMMY2:
3056	{
3057	double rates[190] = { 6.5,
3058	4.5, 10.6,
3059	84.3, 9.5, 643.2,
3060	19.5, 353.7, 10.9, 10.7,
3061	6.1, 486.3, 18.0, 11.6, 0.1,
3062	74.5, 21.5, 13.0, 437.4, 0.1, 342.6,
3063	118.1, 183.9, 17.4, 150.3, 86.8, 7.1, 161.9,
3064	2.8, 346.6, 345.3, 202.4, 111.8, 450.1, 6.2, 2.2,
3065	1.5, 50.6, 25.6, 5.6, 3.4, 3.6, 4.3, 2.5, 8.4,
3066	3.9, 36.9, 2.4, 5.9, 20.3, 26.1, 5.1, 3.4, 17.3, 205.0,
3067	4.2, 712.1, 639.2, 10.1, 0.1, 500.5, 426.6, 29.3, 9.2, 37.9, 10.8,
3068	13.4, 53.5, 9.9, 3.8, 10.5, 9.5, 9.6, 3.8, 3.6, 534.9, 142.8, 83.6,
3069	4.3, 5.0, 8.7, 7.5, 238.0, 2.4, 7.7, 3.1, 11.0, 61.0, 542.3, 9.4, 3.8,
3070	91.2, 69.0, 3.5, 13.4, 6.5, 145.6, 8.1, 2.6, 133.9, 2.1, 155.8, 21.2, 10.5, 12.6,
3071	251.1, 82.9, 271.4, 34.8, 471.9, 10.7, 16.4, 136.7, 19.2, 36.2, 160.3, 23.9, 6.2, 249.4, 348.6,
3072	467.5, 82.5, 215.5, 8.0, 7.4, 5.4, 11.6, 6.3, 3.8, 266.2, 10.7, 140.2, 295.2, 3.6, 181.2, 144.8,
3073	3.4, 171.8, 6.1, 3.5, 518.6, 17.0, 9.1, 49.0, 5.7, 3.3, 98.8, 2.3, 11.1, 34.1, 1.1, 56.3, 1.5,
3074	2.2, 4.3, 69.9, 202.9, 579.1, 9.4, 9.1, 2.1, 889.2, 10.8, 9.6, 20.1, 3.4, 255.9, 5.6, 264.3, 3.3, 21.7,
3075	363.2, 8.4, 1.6, 10.3, 37.8, 5.1, 21.6, 76.0, 1.1, 595.0, 155.8, 9.2, 191.9, 102.2, 7.7, 10.1, 36.8, 5.0, 7.2};
3076
3077	double freqs[20] = {0.061007, 0.060799, 0.043028, 0.038515, 0.011297, 0.035406, 0.050764, 0.073749, 0.024609, 0.085629,
3078	0.106930, 0.046704, 0.023382, 0.056136, 0.043289, 0.073994, 0.052078, 0.018023, 0.036043, 0.058620};
3079
3080
3081	int
3082	i, j, r = 0;
3083
3084	for(i = 1; i < 20; i++)
3085	for(j = 0; j < i; j++)
3086	{
3087	daa[i * 20 + j] = rates[r];
3088	r++;
3089	}
3090
3091	assert(r == 190);
3092
3093	for(i = 0; i < 20; i++)
3094	f[i] = freqs[i];
3095
3096	}
3097
3098	break;
3099	default:
3100	assert(0);
3101	}
3102	}
3103
3104
3105	/*
3106
3107	TODO review frequency sums for fixed as well as empirical base frequencies !
3108
3109	NUMERICAL BUG fix, rounded AA freqs in some models, such that
3110	they actually really sum to 1.0 +/- epsilon
3111
3112	{
3113	double acc = 0.0;
3114
3115	for(i = 0; i < 20; i++)
3116	acc += f[i];
3117
3118	printf("%1.80f\n", acc);
3119	assert(acc == 1.0);
3120	}
3121	*/
3122
3123
3124
3125	for (int i=0; i<20; i++)
3126	for (int j=0; j<i; j++)
3127	daa[j20+i] = daa[i20+j];
3128
3129
3130	/*
3131	for (i=0; i<20; i++)
3132	{
3133	for (j=0; j<20; j++)
3134	{
3135	if(i == j)
3136	printf("0.0 ");
3137	else
3138	printf("%f ", daa[i * 20 + j]);
3139	}
3140	printf("\n");
3141	}
3142
3143	for (i=0; i<20; i++)
3144	printf("%f ", f[i]);
3145	printf("\n");
3146	*/
3147
3148
3149	max = 0;
3150
3151	for(int i = 0; i < 19; i++)
3152	for(int j = i + 1; j < 20; j++)
3153	{
3154	q[i][j] = temp = daa[i * 20 + j];
3155	if(temp > max)
3156	max = temp;
3157	}
3158
3159	scaler = AA_SCALE / max;
3160
3161	/* SCALING HAS BEEN RE-INTRODUCED TO RESOLVE NUMERICAL PROBLEMS */
3162
3163	int r = 0;
3164	for(int i = 0; i < 19; i++)
3165	{
3166	for(int j = i + 1; j < 20; j++)
3167	{
3168
3169	q[i][j] *= scaler;
3170
3171
3172	assert(q[i][j] <= AA_SCALE_PLUS_EPSILON);
3173
3174	initialRates[r++] = q[i][j];
3175	}
3176	}
3177	}
3178
3179
3180
3181	static void updateFracChange(tree *tr)
3182	{
3183	if(tr->NumberOfModels == 1)
3184	{
3185	assert(tr->fracchanges[0] != -1.0);
3186	tr->fracchange = tr->fracchanges[0];
3187	tr->fracchanges[0] = -1.0;
3188
3189	if(tr->useBrLenScaler)
3190	scaleBranches(tr, FALSE);
3191	}
3192	else
3193	{
3194	int
3195	model,
3196	i;
3197
3198	double
3199	modelWeights = (double )rax_calloc(tr->NumberOfModels, sizeof(double)),
3200	wgtsum = 0.0;
3201
3202	assert(tr->NumberOfModels > 1);
3203
3204	tr->fracchange = 0.0;
3205
3206	for(i = 0; i < tr->cdta->endsite; i++)
3207	{
3208	modelWeights[tr->model[i]] += (double)tr->cdta->aliaswgt[i];
3209	wgtsum += (double)tr->cdta->aliaswgt[i];
3210	}
3211
3212	for(model = 0; model < tr->NumberOfModels; model++)
3213	{
3214	tr->partitionContributions[model] = modelWeights[model] / wgtsum;
3215	tr->fracchange += tr->partitionContributions[model] * tr->fracchanges[model];
3216	}
3217
3218	if(tr->useBrLenScaler)
3219	scaleBranches(tr, FALSE);
3220
3221	rax_free(modelWeights);
3222	}
3223
3224	tr->rawFracchange = tr->fracchange;
3225	memcpy(tr->rawFracchanges, tr->fracchanges, sizeof(double) * tr->NumberOfModels);
3226	}
3227
3228	static void mytred2(double *a, const int n, double d, double *e)
3229	{
3230	int l, k, j, i;
3231	double scale, hh, h, g, f;
3232
3233	for (i = n; i > 1; i--)
3234	{
3235	l = i - 1;
3236	h = 0.0;
3237	scale = 0.0;
3238
3239	if (l > 1)
3240	{
3241	for (k = 1; k <= l; k++)
3242	scale += fabs(a[k - 1][i - 1]);
3243	if (scale == 0.0)
3244	e[i - 1] = a[l - 1][i - 1];
3245	else
3246	{
3247	for (k = 1; k <= l; k++)
3248	{
3249	a[k - 1][i - 1] /= scale;
3250	h += a[k - 1][i - 1] * a[k - 1][i - 1];
3251	}
3252	f = a[l - 1][i - 1];
3253	g = ((f > 0) ? -sqrt(h) : sqrt(h)); /* diff */
3254	e[i - 1] = scale * g;
3255	h -= f * g;
3256	a[l - 1][i - 1] = f - g;
3257	f = 0.0;
3258	for (j = 1; j <= l; j++)
3259	{
3260	a[i - 1][j - 1] = a[j - 1][i - 1] / h;
3261	g = 0.0;
3262	for (k = 1; k <= j; k++)
3263	g += a[k - 1][j - 1] * a[k - 1][i - 1];
3264	for (k = j + 1; k <= l; k++)
3265	g += a[j - 1][k - 1] * a[k - 1][i - 1];
3266	e[j - 1] = g / h;
3267	f += e[j - 1] * a[j - 1][i - 1];
3268	}
3269	hh = f / (h + h);
3270	for (j = 1; j <= l; j++)
3271	{
3272	f = a[j - 1][i - 1];
3273	g = e[j - 1] - hh * f;
3274	e[j - 1] = g;
3275	for (k = 1; k <= j; k++)
3276	a[k - 1][j - 1] -= (f * e[k - 1] + g * a[k - 1][i - 1]);
3277	}
3278	}
3279	}
3280	else
3281	e[i - 1] = a[l - 1][i - 1];
3282	d[i - 1] = h;
3283	}
3284	d[0] = 0.0;
3285	e[0] = 0.0;
3286
3287	for (i = 1; i <= n; i++)
3288	{
3289	l = i - 1;
3290	if (d[i - 1] != 0.0)
3291	{
3292	for (j = 1; j <= l; j++)
3293	{
3294	g = 0.0;
3295	for (k = 1; k <= l; k++)
3296	g += a[k - 1][i - 1] * a[j - 1][k - 1];
3297	for(k = 1; k <= l; k++)
3298	a[j - 1][k - 1] -= g * a[i - 1][k - 1];
3299	}
3300	}
3301	d[i - 1] = a[i - 1][i - 1];
3302	a[i - 1][i - 1] = 1.0;
3303	for (j = 1; j <= l; j++)
3304	a[i - 1][j - 1] = a[j - 1][i - 1] = 0.0;
3305	}
3306
3307
3308	}
3309	/#define MYSIGN(a,b) ((b)<0 ? -fabs(a) : fabs(a))/
3310
3311	static int mytqli(double d, double e, const int n, double **z)
3312	{
3313	int m, l, iter, i, k;
3314	double s, r, p, g, f, dd, c, b;
3315
3316	for (i = 2; i <= n; i++)
3317	e[i - 2] = e[i - 1];
3318
3319	e[n - 1] = 0.0;
3320
3321	for (l = 1; l <= n; l++)
3322	{
3323	iter = 0;
3324	do
3325	{
3326	for (m = l; m <= n - 1; m++)
3327	{
3328	dd = fabs(d[m - 1]) + fabs(d[m]);
3329	if (fabs(e[m - 1]) + dd == dd)
3330	break;
3331	}
3332
3333	if (m != l)
3334	{
3335	assert(iter < 30);
3336
3337	g = (d[l] - d[l - 1]) / (2.0 * e[l - 1]);
3338	r = sqrt((g * g) + 1.0);
3339	g = d[m - 1] - d[l - 1] + e[l - 1] / (g + ((g < 0)?-fabs(r):fabs(r)));/MYSIGN(r, g));/
3340	s = c = 1.0;
3341	p = 0.0;
3342
3343	for (i = m - 1; i >= l; i--)
3344	{
3345	f = s * e[i - 1];
3346	b = c * e[i - 1];
3347	if (fabs(f) >= fabs(g))
3348	{
3349	c = g / f;
3350	r = sqrt((c * c) + 1.0);
3351	e[i] = f * r;
3352	c *= (s = 1.0 / r);
3353	}
3354	else
3355	{
3356	s = f / g;
3357	r = sqrt((s * s) + 1.0);
3358	e[i] = g * r;
3359	s *= (c = 1.0 / r);
3360	}
3361	g = d[i] - p;
3362	r = (d[i - 1] - g) * s + 2.0 * c * b;
3363	p = s * r;
3364	d[i] = g + p;
3365	g = c * r - b;
3366	for (k = 1; k <= n; k++)
3367	{
3368	f = z[i][k-1];
3369	z[i][k-1] = s * z[i - 1][k - 1] + c * f;
3370	z[i - 1][k - 1] = c * z[i - 1][k - 1] - s * f;
3371	}
3372	}
3373
3374	d[l - 1] = d[l - 1] - p;
3375	e[l - 1] = g;
3376	e[m - 1] = 0.0;
3377	}
3378	}
3379	while (m != l);
3380	}
3381
3382
3383
3384	return (1);
3385	}
3386
3387
3388	static void makeEigen(double *_a, const int n, double d, double *e)
3389	{
3390	mytred2(_a, n, d, e);
3391	mytqli(d, e, n, _a);
3392	}
3393
3394	static void initGeneric(const int n, const unsigned int *valueVector, int valueVectorLength,
3395	double *fracchanges,
3396	double *ext_EIGN,
3397	double *EV,
3398	double *EI,
3399	double *frequencies,
3400	double *ext_initialRates,
3401	double *tipVector,
3402	int model)
3403	{
3404	double
3405	**r,
3406	**a,
3407	**EIGV,
3408	*initialRates = ext_initialRates,
3409	*f,
3410	*e,
3411	*d,
3412	*invfreq,
3413	*EIGN,
3414	*eptr;
3415
3416	int
3417	i,
3418	j,
3419	k,
3420	m;
3421
3422	r = (double *)rax_malloc(n sizeof(double *));
3423	EIGV = (double *)rax_malloc(n sizeof(double *));
3424	a = (double *)rax_malloc(n sizeof(double *));
3425
3426	for(i = 0; i < n; i++)
3427	{
3428	a[i] = (double)rax_malloc(n sizeof(double));
3429	EIGV[i] = (double)rax_malloc(n sizeof(double));
3430	r[i] = (double)rax_malloc(n sizeof(double));
3431	}
3432
3433	f = (double)rax_malloc(n sizeof(double));
3434	e = (double)rax_malloc(n sizeof(double));
3435	d = (double)rax_malloc(n sizeof(double));
3436	invfreq = (double)rax_malloc(n sizeof(double));
3437	EIGN = (double)rax_malloc(n sizeof(double));
3438
3439
3440	for(int l = 0; l < n; l++)
3441	f[l] = frequencies[l];
3442	/assert(initialRates[numRates - 1] == 1.0); /
3443
3444	i = 0;
3445
3446	for(j = 0; j < n; j++)
3447	for(k = 0; k < n; k++)
3448	r[j][k] = 0.0;
3449
3450	for(j = 0; j < n - 1; j++)
3451	for (k = j+1; k < n; k++)
3452	r[j][k] = initialRates[i++];
3453
3454	for (j = 0; j < n; j++)
3455	{
3456	r[j][j] = 0.0;
3457	for (k = 0; k < j; k++)
3458	r[j][k] = r[k][j];
3459	}
3460
3461	fracchanges[model] = 0.0;
3462
3463	for (j = 0; j< n; j++)
3464	for (k = 0; k< n; k++)
3465	fracchanges[model] += f[j] * r[j][k] * f[k];
3466
3467	m = 0;
3468
3469	for(i=0; i< n; i++)
3470	a[i][i] = 0;
3471
3472	/assert(r[n - 2][n - 1] == 1.0);/
3473
3474	for(i=0; i < n; i++)
3475	{
3476	for(j=i+1; j < n; j++)
3477	{
3478	double factor = initialRates[m++];
3479	a[i][j] = a[j][i] = factor * sqrt( f[i] * f[j]);
3480	a[i][i] -= factor * f[j];
3481	a[j][j] -= factor * f[i];
3482	}
3483	}
3484
3485	makeEigen(a, n, d, e);
3486
3487	for(i=0; i<n; i++)
3488	for(j=0; j<n; j++)
3489	a[i][j] *= sqrt(f[j]);
3490
3491	for (i=0; i<n; i++)
3492	{
3493	if (d[i] > -1e-8)
3494	{
3495	if (i != 0)
3496	{
3497	double tmp = d[i], sum=0;
3498	d[i] = d[0];
3499	d[0] = tmp;
3500	for (j=0; j < n; j++)
3501	{
3502	tmp = a[i][j];
3503	a[i][j] = a[0][j];
3504	sum += (a[0][j] = tmp);
3505	}
3506	for (j=0; j < n; j++)
3507	a[0][j] /= sum;
3508	}
3509	break;
3510	}
3511	}
3512
3513	for (i=0; i< n; i++)
3514	{
3515	EIGN[i] = -d[i];
3516
3517	for (j=0; j<n; j++)
3518	EIGV[i][j] = a[j][i];
3519	invfreq[i] = 1 / EIGV[i][0];
3520	}
3521
3522	for(int l = 1; l < n; l++)
3523	{
3524	ext_EIGN[(l - 1)] = EIGN[l];
3525	assert( ext_EIGN[(l - 1)] > 0.0);
3526	}
3527
3528	eptr = EV;
3529
3530	for(i = 0; i < n; i++)
3531	for(j = 0; j < n; j++)
3532	{
3533	*eptr++ = EIGV[i][j];
3534
3535	}
3536
3537	for(i = 0; i < n; i++)
3538	for(j = 1; j < n; j++)
3539	EI[i * (n - 1) + (j - 1)] = EV[i * n + j] * invfreq[i];
3540
3541	for(i=0; i < valueVectorLength; i++)
3542	{
3543	unsigned int value = valueVector[i];
3544
3545	for(j = 0; j < n; j++)
3546	tipVector[i * n + j] = 0;
3547
3548	if(value > 0)
3549	{
3550	for (j = 0; j < n; j++)
3551	{
3552	if ((value >> j) & 1)
3553	{
3554	int l;
3555	for(l = 0; l < n; l++)
3556	tipVector[i * n + l] += EIGV[j][l];
3557	}
3558	}
3559	}
3560	}
3561
3562	for(i = 0; i < valueVectorLength; i++)
3563	{
3564	for(j = 0; j < n; j++)
3565	if(tipVector[i * n + j] > MAX_TIP_EV)
3566	tipVector[i * n + j] = MAX_TIP_EV;
3567	}
3568
3569
3570
3571
3572	for(i = 0; i < n; i++)
3573	{
3574	rax_free(EIGV[i]);
3575	rax_free(a[i]);
3576	rax_free(r[i]);
3577	}
3578
3579	rax_free(r);
3580	rax_free(a);
3581	rax_free(EIGV);
3582
3583	rax_free(f);
3584	rax_free(e);
3585	rax_free(d);
3586	rax_free(invfreq);
3587	rax_free(EIGN);
3588	}
3589
3590
3591
3592
3593	void initReversibleGTR(tree *tr, int model)
3594	{
3595	double
3596	*fracchanges = tr->fracchanges,
3597	*ext_EIGN = tr->partitionData[model].EIGN,
3598	*EV = tr->partitionData[model].EV,
3599	*EI = tr->partitionData[model].EI,
3600	*frequencies = tr->partitionData[model].frequencies,
3601	*ext_initialRates = tr->partitionData[model].substRates,
3602	*tipVector = tr->partitionData[model].tipVector;
3603
3604
3605
3606	int states = tr->partitionData[model].states;
3607
3608	switch(tr->partitionData[model].dataType)
3609	{
3610	case GENERIC_32:
3611	case GENERIC_64:
3612	case SECONDARY_DATA_6:
3613	case SECONDARY_DATA_7:
3614	case SECONDARY_DATA:
3615	case DNA_DATA:
3616	case BINARY_DATA:
3617	initGeneric(states,
3618	getBitVector(tr->partitionData[model].dataType),
3619	getUndetermined(tr->partitionData[model].dataType) + 1,
3620	fracchanges,
3621	ext_EIGN,
3622	EV,
3623	EI,
3624	frequencies,
3625	ext_initialRates,
3626	tipVector,
3627	model);
3628	break;
3629	case AA_DATA:
3630	if(!((tr->partitionData[model].protModels == GTR) \|\| (tr->partitionData[model].protModels == GTR_UNLINKED)))
3631	{
3632	double
3633	f[20];
3634
3635	int
3636	l;
3637
3638	if(tr->partitionData[model].protModels == LG4 \|\| tr->partitionData[model].protModels == LG4X)
3639	{
3640	int
3641	i;
3642
3643	for(i = 0; i < 4; i++)
3644	{
3645	initProtMat(f, tr->partitionData[model].protModels, &(tr->partitionData[model].substRates_LG4[i][0]), model, tr, i);
3646
3647	if(tr->partitionData[model].usePredefinedProtFreqs == TRUE)
3648	for(l = 0; l < 20; l++)
3649	tr->partitionData[model].frequencies_LG4[i][l] = f[l];
3650	else
3651	memcpy(tr->partitionData[model].frequencies_LG4[i], frequencies, 20 * sizeof(double));
3652	}
3653	}
3654	else
3655	{
3656	if(tr->partitionData[model].protModels == AUTO)
3657	{
3658	//printf("init prot mat %s partition %d\n", protModels[tr->partitionData[model].autoProtModels], model);
3659	initProtMat(f, tr->partitionData[model].autoProtModels, ext_initialRates, model, tr, 0);
3660	}
3661	else
3662	initProtMat(f, tr->partitionData[model].protModels, ext_initialRates, model, tr, 0);
3663
3664	if(tr->partitionData[model].protModels == PROT_FILE)
3665	assert(tr->partitionData[model].usePredefinedProtFreqs == TRUE);
3666
3667	if(tr->partitionData[model].usePredefinedProtFreqs == TRUE)
3668	for(l = 0; l < 20; l++)
3669	frequencies[l] = f[l];
3670	}
3671	}
3672	else
3673	assert(tr->partitionData[model].usePredefinedProtFreqs == FALSE);
3674
3675	if(tr->partitionData[model].protModels == LG4 \|\| tr->partitionData[model].protModels == LG4X)
3676	{
3677	int
3678	i;
3679
3680	double
3681	*fracchanges_LG4[4],
3682	acc = 0.0;
3683
3684	/* TODO frac change !*/
3685
3686	for(i = 0; i < 4; i++)
3687	{
3688	fracchanges_LG4[i] = (double )rax_malloc(tr->NumberOfModels sizeof(double));
3689	initGeneric(states, bitVectorAA, 23, fracchanges_LG4[i],
3690	tr->partitionData[model].EIGN_LG4[i], tr->partitionData[model].EV_LG4[i], tr->partitionData[model].EI_LG4[i], tr->partitionData[model].frequencies_LG4[i], tr->partitionData[model].substRates_LG4[i],
3691	tr->partitionData[model].tipVector_LG4[i],
3692	model);
3693	}
3694
3695	for(i = 0; i < 4; i++)
3696	{
3697	acc += fracchanges_LG4[i][model];
3698	rax_free(fracchanges_LG4[i]);
3699	}
3700
3701	tr->fracchanges[model] = acc / 4;
3702	}
3703	else
3704	initGeneric(states, bitVectorAA, 23, fracchanges,
3705	ext_EIGN, EV, EI, frequencies, ext_initialRates,
3706	tipVector,
3707	model);
3708	break;
3709	default:
3710	assert(0);
3711	}
3712
3713
3714	updateFracChange(tr);
3715	}
3716
3717
3718	double LnGamma (double alpha)
3719	{
3720	/* returns ln(gamma(alpha)) for alpha>0, accurate to 10 decimal places.
3721	Stirling's formula is used for the central polynomial part of the procedure.
3722	Pike MC & Hill ID (1966) Algorithm 291: Logarithm of the gamma function.
3723	Communications of the Association for Computing Machinery, 9:684
3724	*/
3725	double x, f, z, result;
3726
3727	x = alpha;
3728	f = 0.0;
3729
3730	if ( x < 7.0)
3731	{
3732	f = 1.0;
3733	z = alpha - 1.0;
3734
3735	while ((z = z + 1.0) < 7.0)
3736	{
3737	f *= z;
3738	}
3739	x = z;
3740
3741	assert(f != 0.0);
3742
3743	f=-log(f);
3744	}
3745
3746	z = 1/(x*x);
3747
3748	result = f + (x-0.5)*log(x) - x + .918938533204673
3749	+ (((-.000595238095238z+.000793650793651)z-.002777777777778)*z
3750	+.083333333333333)/x;
3751
3752	return result;
3753	}
3754
3755
3756
3757	double IncompleteGamma (double x, double alpha, double ln_gamma_alpha)
3758	{
3759	/* returns the incomplete gamma ratio I(x,alpha) where x is the upper
3760	limit of the integration and alpha is the shape parameter.
3761	returns (-1) if in error
3762	ln_gamma_alpha = ln(Gamma(alpha)), is almost redundant.
3763	(1) series expansion if (alpha>x \|\| x<=1)
3764	(2) continued fraction otherwise
3765	RATNEST FORTRAN by
3766	Bhattacharjee GP (1970) The incomplete gamma integral. Applied Statistics,
3767	19: 285-287 (AS32)
3768	*/
3769	int i;
3770	double p=alpha, g=ln_gamma_alpha;
3771	double accurate=1e-8, overflow=1e30;
3772	double factor, gin=0, rn=0, a=0,b=0,an=0,dif=0, term=0, pn[6];
3773
3774
3775	if (x==0) return (0);
3776	if (x<0 \|\| p<=0) return (-1);
3777
3778
3779	factor=exp(p*log(x)-x-g);
3780	if (x>1 && x>=p) goto l30;
3781	/* (1) series expansion */
3782	gin=1; term=1; rn=p;
3783	l20:
3784	rn++;
3785	term*=x/rn; gin+=term;
3786
3787	if (term > accurate) goto l20;
3788	gin*=factor/p;
3789	goto l50;
3790	l30:
3791	/* (2) continued fraction */
3792	a=1-p; b=a+x+1; term=0;
3793	pn[0]=1; pn[1]=x; pn[2]=x+1; pn[3]=x*b;
3794	gin=pn[2]/pn[3];
3795	l32:
3796	a++;
3797	b+=2;
3798	term++;
3799	an=a*term;
3800	for (i=0; i<2; i++)
3801	pn[i+4]=bpn[i+2]-anpn[i];
3802	if (pn[5] == 0) goto l35;
3803	rn=pn[4]/pn[5];
3804	dif=fabs(gin-rn);
3805	if (dif>accurate) goto l34;
3806	if (dif<=accurate*rn) goto l42;
3807	l34:
3808	gin=rn;
3809	l35:
3810	for (i=0; i<4; i++)
3811	pn[i]=pn[i+2];
3812	if (fabs(pn[4]) < overflow)
3813	goto l32;
3814
3815	for (i=0; i<4; i++)
3816	pn[i]/=overflow;
3817
3818
3819	goto l32;
3820	l42:
3821	gin=1-factor*gin;
3822
3823	l50:
3824	return (gin);
3825	}
3826
3827
3828
3829
3830	double PointNormal (double prob)
3831	{
3832	/* returns z so that Prob{x<z}=prob where x ~ N(0,1) and (1e-12)<prob<1-(1e-12)
3833	returns (-9999) if in error
3834	Odeh RE & Evans JO (1974) The percentage points of the normal distribution.
3835	Applied Statistics 22: 96-97 (AS70)
3836
3837	Newer methods:
3838	Wichura MJ (1988) Algorithm AS 241: the percentage points of the
3839	normal distribution. 37: 477-484.
3840	Beasley JD & Springer SG (1977). Algorithm AS 111: the percentage
3841	points of the normal distribution. 26: 118-121.
3842
3843	*/
3844	double a0=-.322232431088, a1=-1, a2=-.342242088547, a3=-.0204231210245;
3845	double a4=-.453642210148e-4, b0=.0993484626060, b1=.588581570495;
3846	double b2=.531103462366, b3=.103537752850, b4=.0038560700634;
3847	double y, z=0, p=prob, p1;
3848
3849	p1 = (p<0.5 ? p : 1-p);
3850	if (p1<1e-20) return (-9999);
3851
3852	y = sqrt (log(1/(p1*p1)));
3853	z = y + ((((ya4+a3)y+a2)y+a1)y+a0) / ((((yb4+b3)y+b2)y+b1)y+b0);
3854	return (p<0.5 ? -z : z);
3855	}
3856
3857
3858	double PointChi2 (double prob, double v)
3859	{
3860	/* returns z so that Prob{x<z}=prob where x is Chi2 distributed with df=v
3861	returns -1 if in error. 0.000002<prob<0.999998
3862	RATNEST FORTRAN by
3863	Best DJ & Roberts DE (1975) The percentage points of the
3864	Chi2 distribution. Applied Statistics 24: 385-388. (AS91)
3865	Converted into C by Ziheng Yang, Oct. 1993.
3866	*/
3867	double e=.5e-6, aa=.6931471805, p=prob, g;
3868	double xx, c, ch, a=0,q=0,p1=0,p2=0,t=0,x=0,b=0,s1,s2,s3,s4,s5,s6;
3869
3870	if (p<.000002 \|\| p>.999998 \|\| v<=0) return (-1);
3871
3872	g = LnGamma(v/2);
3873
3874	xx=v/2; c=xx-1;
3875	if (v >= -1.24*log(p)) goto l1;
3876
3877	ch=pow((pxxexp(g+xx*aa)), 1/xx);
3878	if (ch-e<0) return (ch);
3879	goto l4;
3880	l1:
3881	if (v>.32) goto l3;
3882	ch=0.4; a=log(1-p);
3883	l2:
3884	q=ch; p1=1+ch(4.67+ch); p2=ch(6.73+ch*(6.66+ch));
3885	t=-0.5+(4.67+2ch)/p1 - (6.73+ch(13.32+3*ch))/p2;
3886	ch-=(1-exp(a+g+.5ch+caa)*p2/p1)/t;
3887	if (fabs(q/ch-1)-.01 <= 0) goto l4;
3888	else goto l2;
3889
3890	l3:
3891	x=PointNormal (p);
3892	p1=0.222222/v; ch=vpow((xsqrt(p1)+1-p1), 3.0);
3893	if (ch>2.2v+6) ch=-2(log(1-p)-clog(.5ch)+g);
3894	l4:
3895	q=ch; p1=.5*ch;
3896	if ((t=IncompleteGamma (p1, xx, g))< 0.0)
3897	{
3898	printf ("IncompleteGamma \n");
3899	return (-1);
3900	}
3901
3902	p2=p-t;
3903	t=p2exp(xxaa+g+p1-c*log(ch));
3904	b=t/ch; a=0.5t-bc;
3905
3906	s1=(210+a(140+a(105+a(84+a(70+60*a))))) / 420;
3907	s2=(420+a(735+a(966+a(1141+1278a))))/2520;
3908	s3=(210+a(462+a(707+932*a)))/2520;
3909	s4=(252+a(672+1182a)+c(294+a(889+1740*a)))/5040;
3910	s5=(84+264a+c(175+606*a))/2520;
3911	s6=(120+c(346+127c))/5040;
3912	ch+=t(1+0.5ts1-bc(s1-b(s2-b(s3-b(s4-b(s5-bs6))))));
3913	if (fabs(q/ch-1) > e) goto l4;
3914
3915	return (ch);
3916	}
3917
3918
3919
3920
3921
3922
3923	void makeGammaCats(double alpha, double *gammaRates, int K, boolean useMedian)
3924	{
3925	int
3926	i;
3927
3928	double
3929	factor = alpha / alpha * K,
3930	lnga1,
3931	alfa = alpha,
3932	beta = alpha,
3933	gammaProbs = (double )rax_malloc(K * sizeof(double));
3934
3935	/* Note that ALPHA_MIN setting is somewhat critical due to */
3936	/* numerical instability caused by very small rate[0] values */
3937	/* induced by low alpha values around 0.01 */
3938
3939	assert(alfa >= ALPHA_MIN);
3940
3941	if(useMedian)
3942	{
3943	double
3944	middle = 1.0 / (2.0*K),
3945	t = 0.0;
3946
3947	for(i = 0; i < K; i++)
3948	gammaRates[i] = PointGamma((double)(i * 2 + 1) * middle, alfa, beta);
3949
3950	for (i = 0; i < K; i++)
3951	t += gammaRates[i];
3952	for( i = 0; i < K; i++)
3953	gammaRates[i] *= factor / t;
3954	}
3955	else
3956	{
3957	lnga1 = LnGamma(alfa + 1);
3958
3959	for (i = 0; i < K - 1; i++)
3960	gammaProbs[i] = PointGamma((i + 1.0) / K, alfa, beta);
3961
3962	for (i = 0; i < K - 1; i++)
3963	gammaProbs[i] = IncompleteGamma(gammaProbs[i] * beta, alfa + 1, lnga1);
3964
3965	gammaRates[0] = gammaProbs[0] * factor;
3966
3967	gammaRates[K - 1] = (1 - gammaProbs[K - 2]) * factor;
3968
3969	for (i= 1; i < K - 1; i++)
3970	gammaRates[i] = (gammaProbs[i] - gammaProbs[i - 1]) * factor;
3971	}
3972	/* assert(gammaRates[0] >= 0.00000000000000000000000000000044136090435925743185910935350715027016962154188875); */
3973
3974	rax_free(gammaProbs);
3975
3976	return;
3977	}
3978
3979	static void genericInvariant(tree tr, int lower, int upper, const unsigned int bitVector,
3980	unsigned int undetermined, int states, int numberOfInvariableColumns, int weightOfInvariableColumns)
3981	{
3982	int
3983	count = 0,
3984	sum = 0,
3985	i,
3986	j;
3987
3988	for(i = lower; i < upper; i++)
3989	{
3990	unsigned int
3991	encoding = 0,
3992	code;
3993	int
3994	secSum = 0,
3995	position = -1;
3996
3997	for(j = 1; j <= tr->mxtips; j++)
3998	{
3999	code = bitVector[tr->yVector[j][i]];
4000	if(code != undetermined)
4001	{
4002	if(!(code & encoding))
4003	encoding = encoding \| code;
4004	else
4005	encoding = encoding \| (encoding & code);
4006	}
4007	}
4008
4009	for(j = 0; j < states; j++)
4010	{
4011	if(encoding >> j & 1)
4012	{
4013	secSum++;
4014	position = j;
4015	}
4016	}
4017
4018	if(secSum == 1)
4019	{
4020	assert(position >= 0);
4021	tr->invariant[i] = position;
4022	count = count + 1;
4023	sum = sum + tr->cdta->aliaswgt[i];
4024	}
4025	else
4026	tr->invariant[i] = states;
4027	}
4028
4029	*numberOfInvariableColumns += count;
4030	*weightOfInvariableColumns += sum;
4031	}
4032
4033	static void setRates(double *r, int rates)
4034	{
4035	int i;
4036
4037	for(i = 0; i < rates - 1; i++)
4038	r[i] = 0.5;
4039	r[rates - 1] = 1.0;
4040	}
4041
4042	void initRateMatrix(tree *tr)
4043	{
4044	int model;
4045
4046	for(model = 0; model < tr->NumberOfModels; model++)
4047	{
4048	int
4049	states = tr->partitionData[model].states,
4050	rates = (states * states - states) / 2;
4051
4052	switch(tr->partitionData[model].dataType)
4053	{
4054	case BINARY_DATA:
4055	case DNA_DATA:
4056	case SECONDARY_DATA:
4057	case SECONDARY_DATA_6:
4058	case SECONDARY_DATA_7:
4059	setRates(tr->partitionData[model].substRates, rates);
4060	break;
4061	case GENERIC_32:
4062	case GENERIC_64:
4063	switch(tr->multiStateModel)
4064	{
4065	case ORDERED_MULTI_STATE:
4066	{
4067	int
4068	j,
4069	k,
4070	i = 0;
4071
4072	for(j = 0; j < states; j++)
4073	for(k = j + 1; k < states; k++)
4074	tr->partitionData[model].substRates[i++] = (double)(k - j);
4075	assert(i == rates);
4076	}
4077	break;
4078	case MK_MULTI_STATE:
4079	for(int i = 0; i < rates; i++)
4080	tr->partitionData[model].substRates[i] = 1.0;
4081
4082	break;
4083	case GTR_MULTI_STATE:
4084	setRates(tr->partitionData[model].substRates, rates);
4085	break;
4086	default:
4087	assert(0);
4088	}
4089	break;
4090	case AA_DATA:
4091	if(tr->partitionData[model].protModels == GTR \|\| tr->partitionData[model].protModels == GTR_UNLINKED)
4092	putWAG(tr->partitionData[model].substRates);
4093	break;
4094	default:
4095	assert(0);
4096	}
4097
4098	if(tr->partitionData[model].nonGTR)
4099	{
4100	assert(tr->partitionData[model].dataType == SECONDARY_DATA \|\|
4101	tr->partitionData[model].dataType == SECONDARY_DATA_6 \|\|
4102	tr->partitionData[model].dataType == SECONDARY_DATA_7);
4103
4104	for(int i = 0; i < rates; i++)
4105	{
4106	if(tr->partitionData[model].symmetryVector[i] == -1)
4107	tr->partitionData[model].substRates[i] = 0.0;
4108	else
4109	{
4110	if(tr->partitionData[model].symmetryVector[i] == tr->partitionData[model].symmetryVector[rates - 1])
4111	tr->partitionData[model].substRates[i] = 1.0;
4112	}
4113	}
4114	}
4115	}
4116	}
4117
4118	static void setSymmetry(int s, int sDest, const int sCount, int f, int fDest, const int fCount)
4119	{
4120	int i;
4121
4122	for(i = 0; i < sCount; i++)
4123	sDest[i] = s[i];
4124
4125	for(i = 0; i < fCount; i++)
4126	fDest[i] = f[i];
4127	}
4128
4129	static void setupSecondaryStructureSymmetries(tree *tr)
4130	{
4131	int model;
4132
4133	for(model = 0; model < tr->NumberOfModels; model++)
4134	{
4135	if(tr->partitionData[model].dataType == SECONDARY_DATA \|\|
4136	tr->partitionData[model].dataType == SECONDARY_DATA_6 \|\|
4137	tr->partitionData[model].dataType == SECONDARY_DATA_7)
4138	{
4139	switch(tr->secondaryStructureModel)
4140	{
4141	case SEC_6_A:
4142	tr->partitionData[model].nonGTR = FALSE;
4143	break;
4144	case SEC_6_B:
4145	{
4146	int f[6] = {0, 1, 2, 3, 4, 5};
4147	int s[15] = {2, 0, 1, 2, 2, 2, 2, 0, 1, 1, 2, 2, 2, 2, 1};
4148
4149	setSymmetry(s, tr->partitionData[model].symmetryVector, 15, f, tr->partitionData[model].frequencyGrouping, 6);
4150
4151	tr->partitionData[model].nonGTR = TRUE;
4152	}
4153	break;
4154	case SEC_6_C:
4155	{
4156	int f[6] = {0, 2, 2, 1, 0, 1};
4157	int s[15] = {2, 0, 1, 2, 2, 2, 2, 0, 1, 1, 2, 2, 2, 2, 1};
4158
4159	setSymmetry(s, tr->partitionData[model].symmetryVector, 15, f, tr->partitionData[model].frequencyGrouping, 6);
4160
4161	tr->partitionData[model].nonGTR = TRUE;
4162	}
4163	break;
4164	case SEC_6_D:
4165	{
4166	int f[6] = {0, 2, 2, 1, 0, 1};
4167	int s[15] = {2, -1, 1, 2, 2, 2, 2, -1, 1, 1, 2, 2, 2, 2, 1};
4168
4169	setSymmetry(s, tr->partitionData[model].symmetryVector, 15, f, tr->partitionData[model].frequencyGrouping, 6);
4170
4171	tr->partitionData[model].nonGTR = TRUE;
4172	}
4173	break;
4174	case SEC_6_E:
4175	{
4176	int f[6] = {0, 1, 2, 3, 4, 5};
4177	int s[15] = {2, -1, 1, 2, 2, 2, 2, -1, 1, 1, 2, 2, 2, 2, 1};
4178
4179	setSymmetry(s, tr->partitionData[model].symmetryVector, 15, f, tr->partitionData[model].frequencyGrouping, 6);
4180
4181	tr->partitionData[model].nonGTR = TRUE;
4182	}
4183	break;
4184	case SEC_7_A:
4185	tr->partitionData[model].nonGTR = FALSE;
4186	break;
4187	case SEC_7_B:
4188	{
4189	int f[7] = {0, 2, 2, 1, 0, 1, 3};
4190	int s[21] = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20};
4191
4192	setSymmetry(s, tr->partitionData[model].symmetryVector, 21, f, tr->partitionData[model].frequencyGrouping, 7);
4193
4194	tr->partitionData[model].nonGTR = TRUE;
4195
4196	}
4197	break;
4198	case SEC_7_C:
4199	{
4200	int f[7] = {0, 1, 2, 3, 4, 5, 6};
4201	int s[21] = {-1, -1, 0, -1, -1, 4, -1, -1, -1, 3, 5, 1, -1, -1, 6, -1, -1, 7, 2, 8, 9};
4202
4203	setSymmetry(s, tr->partitionData[model].symmetryVector, 21, f, tr->partitionData[model].frequencyGrouping, 7);
4204
4205	tr->partitionData[model].nonGTR = TRUE;
4206
4207	}
4208	break;
4209	case SEC_7_D:
4210	{
4211	int f[7] = {0, 1, 2, 3, 4, 5, 6};
4212	int s[21] = {2, 0, 1, 2, 2, 3, 2, 2, 0, 1, 3, 1, 2, 2, 3, 2, 2, 3, 1, 3, 3};
4213
4214	setSymmetry(s, tr->partitionData[model].symmetryVector, 21, f, tr->partitionData[model].frequencyGrouping, 7);
4215
4216	tr->partitionData[model].nonGTR = TRUE;
4217
4218	}
4219	break;
4220	case SEC_7_E:
4221	{
4222	int f[7] = {0, 1, 2, 3, 4, 5, 6};
4223	int s[21] = {-1, -1, 0, -1, -1, 1, -1, -1, -1, 0, 1, 0, -1, -1, 1, -1, -1, 1, 0, 1, 1};
4224
4225	setSymmetry(s, tr->partitionData[model].symmetryVector, 21, f, tr->partitionData[model].frequencyGrouping, 7);
4226
4227	tr->partitionData[model].nonGTR = TRUE;
4228
4229	}
4230	break;
4231	case SEC_7_F:
4232	{
4233	int f[7] = {0, 2, 2, 1, 0, 1, 3};
4234	int s[21] = {2, 0, 1, 2, 2, 3, 2, 2, 0, 1, 3, 1, 2, 2, 3, 2, 2, 3, 1, 3, 3};
4235
4236	setSymmetry(s, tr->partitionData[model].symmetryVector, 21, f, tr->partitionData[model].frequencyGrouping, 7);
4237
4238	tr->partitionData[model].nonGTR = TRUE;
4239
4240	}
4241	break;
4242
4243	case SEC_16:
4244	tr->partitionData[1].nonGTR = FALSE;
4245	break;
4246	case SEC_16_A:
4247	{
4248	int f[16] = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15};
4249	int s[120] = {/* AA */ 4, 4, 3, 4, -1, -1, -1, 4, -1, -1, -1, 3, -1, -1, -1,
4250	/* AC */ 4, 3, -1, 4, -1, -1, -1, 3, -1, -1, -1, 4, -1, -1,
4251	/* AG */ 3, -1, -1, 3, -1, -1, -1, 4, -1, -1, -1, 3, -1,
4252	/* AU */ -1, -1, 2, 3, -1, 0, -1, 1, 2, -1, 2, 3,
4253	/* CA */ 4, 3, 4, 4, -1, -1, -1, 3, -1, -1, -1,
4254	/* CC */ 3, 4, -1, 3, -1, -1, -1, 4, -1, -1,
4255	/* CG */ 3, -1, 2, 3, 2, 0, -1, 1, -1,
4256	/* CU */ -1, -1, -1, 3, -1, -1, -1, 4,
4257	/* GA */ 3, 4, 3, 3, -1, -1, -1,
4258	/* GC */ 3, 1, 2, 3, 2, -1,
4259	/* GG */ 3, -1, -1, 3, -1,
4260	/* GU */ 2, -1, 2, 3,
4261	/* UA */ 3, 1, 3,
4262	/* UC */ 3, 4,
4263	/* UG */ 3};
4264
4265
4266	setSymmetry(s, tr->partitionData[model].symmetryVector, 120, f, tr->partitionData[model].frequencyGrouping, 16);
4267
4268	tr->partitionData[model].nonGTR = TRUE;
4269
4270	}
4271	break;
4272	case SEC_16_B:
4273	{
4274	int f[16] = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15};
4275	int s[120] = {/* AA */ 0, 0, 0, 0, -1, -1, -1, 0, -1, -1, -1, 0, -1, -1, -1,
4276	/* AC */ 0, 0, -1, 0, -1, -1, -1, 0, -1, -1, -1, 0, -1, -1,
4277	/* AG */ 0, -1, -1, 0, -1, -1, -1, 0, -1, -1, -1, 0, -1,
4278	/* AU */ -1, -1, 0, 0, -1, 0, -1, 0, 0, -1, 0, 0,
4279	/* CA */ 0, 0, 0, 0, -1, -1, -1, 0, -1, -1, -1,
4280	/* CC */ 0, 0, -1, 0, -1, -1, -1, 0, -1, -1,
4281	/* CG */ 0, -1, 0, 0, 0, 0, -1, 0, -1,
4282	/* CU */ -1, -1, -1, 0, -1, -1, -1, 0,
4283	/* GA */ 0, 0, 0, 0, -1, -1, -1,
4284	/* GC */ 0, 0, 0, 0, 0, -1,
4285	/* GG */ 0, -1, -1, 0, -1,
4286	/* GU */ 0, -1, 0, 0,
4287	/* UA */ 0, 0, 0,
4288	/* UC */ 0, 0,
4289	/* UG */ 0};
4290
4291
4292	setSymmetry(s, tr->partitionData[model].symmetryVector, 120, f, tr->partitionData[model].frequencyGrouping, 16);
4293
4294	tr->partitionData[model].nonGTR = TRUE;
4295	}
4296	break;
4297	case SEC_16_C:
4298	case SEC_16_D:
4299	case SEC_16_E:
4300	case SEC_16_F:
4301	case SEC_16_I:
4302	case SEC_16_J:
4303	case SEC_16_K:
4304	assert(0);
4305	default:
4306	assert(0);
4307	}
4308	}
4309
4310	}
4311
4312	}
4313
4314	void initModel(tree tr, rawdata rdta, cruncheddata cdta, analdef adef)
4315	{
4316	int
4317	model,
4318	j;
4319
4320	double
4321	temp;
4322
4323	optimizeRateCategoryInvocations = 1;
4324	tr->numberOfInvariableColumns = 0;
4325	tr->weightOfInvariableColumns = 0;
4326
4327	for(model = 0; model < tr->NumberOfModels; model++)
4328	tr->partitionData[model].numberOfCategories = 1;
4329
4330	for (j = 0; j < tr->cdta->endsite; j++)
4331	{
4332	tr->cdta->patrat[j] = temp = 1.0;
4333	tr->cdta->patratStored[j] = 1.0;
4334	tr->cdta->rateCategory[j] = 0;
4335	}
4336
4337	for(model = 0; model < tr->NumberOfModels; model++)
4338	{
4339	tr->partitionData[model].numberOfCategories = 1;
4340	tr->partitionData[model].perSiteRates[0] = 1.0;
4341	tr->partitionData[model].unscaled_perSiteRates[0] = 1.0;
4342	}
4343
4344	updatePerSiteRates(tr, FALSE);
4345
4346	setupSecondaryStructureSymmetries(tr);
4347
4348	for(model = 0; model < tr->NumberOfModels; model++)
4349	{
4350	if(adef->useInvariant)
4351	{
4352	size_t
4353	i;
4354
4355	int
4356	count = 0,
4357	total = 0,
4358	states = tr->partitionData[model].states;
4359
4360
4361	genericInvariant(tr, tr->partitionData[model].lower, tr->partitionData[model].upper,
4362	getBitVector(tr->partitionData[model].dataType),
4363	getUndetermined(tr->partitionData[model].dataType),
4364	states,
4365	&(tr->numberOfInvariableColumns),
4366	&(tr->weightOfInvariableColumns));
4367
4368	for(i = tr->partitionData[model].lower; i < tr->partitionData[model].upper; i++)
4369	{
4370	if(tr->invariant[i] < states)
4371	count += tr->cdta->aliaswgt[i];
4372
4373	total += tr->cdta->aliaswgt[i];
4374	}
4375
4376	tr->partitionData[model].propInvariant = ((double)count)/((double) total);
4377	}
4378	}
4379
4380	initRateMatrix(tr);
4381
4382	baseFrequenciesGTR(rdta, cdta, tr);
4383
4384	for(model = 0; model < tr->NumberOfModels; model++)
4385	{
4386	tr->partitionData[model].alpha = 1.0;
4387	tr->partitionData[model].brLenScaler = 1.0;
4388
4389	if(tr->partitionData[model].protModels == AUTO)
4390	tr->partitionData[model].autoProtModels = WAG; /* initialize by WAG per default */
4391
4392	initReversibleGTR(tr, model);
4393	makeGammaCats(tr->partitionData[model].alpha, tr->partitionData[model].gammaRates, 4, tr->useGammaMedian);
4394
4395	for(j = 0; j < 4; j++)
4396	{
4397	tr->partitionData[model].weights[j] = 0.25;
4398	tr->partitionData[model].weightExponents[j] = 0.0;
4399	}
4400	}
4401
4402
4403
4404	if(tr->NumberOfModels > 1)
4405	{
4406	tr->fracchange = 0;
4407	for(model = 0; model < tr->NumberOfModels; model++)
4408	tr->fracchange += tr->fracchanges[model];
4409
4410	tr->fracchange /= ((double)tr->NumberOfModels);
4411	}
4412
4413	#ifdef _USE_PTHREADS
4414	masterBarrier(THREAD_COPY_INIT_MODEL, tr);
4415	#endif
4416	}
4417
4418
4419
4420

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source: branches/species/GDE/RAxML/models.c

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