*DECK DGAMLN DOUBLE PRECISION FUNCTION DGAMLN (Z, IERR) C***BEGIN PROLOGUE DGAMLN C***SUBSIDIARY C***PURPOSE Compute the logarithm of the Gamma function C***LIBRARY SLATEC C***CATEGORY C7A C***TYPE DOUBLE PRECISION (GAMLN-S, DGAMLN-D) C***KEYWORDS LOGARITHM OF GAMMA FUNCTION C***AUTHOR Amos, D. E., (SNL) C***DESCRIPTION C C **** A DOUBLE PRECISION ROUTINE **** C DGAMLN COMPUTES THE NATURAL LOG OF THE GAMMA FUNCTION FOR C Z.GT.0. THE ASYMPTOTIC EXPANSION IS USED TO GENERATE VALUES C GREATER THAN ZMIN WHICH ARE ADJUSTED BY THE RECURSION C G(Z+1)=Z*G(Z) FOR Z.LE.ZMIN. THE FUNCTION WAS MADE AS C PORTABLE AS POSSIBLE BY COMPUTING ZMIN FROM THE NUMBER OF BASE C 10 DIGITS IN A WORD, RLN=MAX(-ALOG10(R1MACH(4)),0.5E-18) C LIMITED TO 18 DIGITS OF (RELATIVE) ACCURACY. C C SINCE INTEGER ARGUMENTS ARE COMMON, A TABLE LOOK UP ON 100 C VALUES IS USED FOR SPEED OF EXECUTION. C C DESCRIPTION OF ARGUMENTS C C INPUT Z IS D0UBLE PRECISION C Z - ARGUMENT, Z.GT.0.0D0 C C OUTPUT DGAMLN IS DOUBLE PRECISION C DGAMLN - NATURAL LOG OF THE GAMMA FUNCTION AT Z.NE.0.0D0 C IERR - ERROR FLAG C IERR=0, NORMAL RETURN, COMPUTATION COMPLETED C IERR=1, Z.LE.0.0D0, NO COMPUTATION C C C***REFERENCES COMPUTATION OF BESSEL FUNCTIONS OF COMPLEX ARGUMENT C BY D. E. AMOS, SAND83-0083, MAY, 1983. C***ROUTINES CALLED D1MACH, I1MACH C***REVISION HISTORY (YYMMDD) C 830501 DATE WRITTEN C 830501 REVISION DATE from Version 3.2 C 910415 Prologue converted to Version 4.0 format. (BAB) C 920128 Category corrected. (WRB) C 921215 DGAMLN defined for Z negative. (WRB) C***END PROLOGUE DGAMLN DOUBLE PRECISION CF, CON, FLN, FZ, GLN, RLN, S, TLG, TRM, TST, * T1, WDTOL, Z, ZDMY, ZINC, ZM, ZMIN, ZP, ZSQ, D1MACH INTEGER I, IERR, I1M, K, MZ, NZ, I1MACH DIMENSION CF(22), GLN(100) C LNGAMMA(N), N=1,100 DATA GLN(1), GLN(2), GLN(3), GLN(4), GLN(5), GLN(6), GLN(7), 1 GLN(8), GLN(9), GLN(10), GLN(11), GLN(12), GLN(13), GLN(14), 2 GLN(15), GLN(16), GLN(17), GLN(18), GLN(19), GLN(20), 3 GLN(21), GLN(22)/ 4 0.00000000000000000D+00, 0.00000000000000000D+00, 5 6.93147180559945309D-01, 1.79175946922805500D+00, 6 3.17805383034794562D+00, 4.78749174278204599D+00, 7 6.57925121201010100D+00, 8.52516136106541430D+00, 8 1.06046029027452502D+01, 1.28018274800814696D+01, 9 1.51044125730755153D+01, 1.75023078458738858D+01, A 1.99872144956618861D+01, 2.25521638531234229D+01, B 2.51912211827386815D+01, 2.78992713838408916D+01, C 3.06718601060806728D+01, 3.35050734501368889D+01, D 3.63954452080330536D+01, 3.93398841871994940D+01, E 4.23356164607534850D+01, 4.53801388984769080D+01/ DATA GLN(23), GLN(24), GLN(25), GLN(26), GLN(27), GLN(28), 1 GLN(29), GLN(30), GLN(31), GLN(32), GLN(33), GLN(34), 2 GLN(35), GLN(36), GLN(37), GLN(38), GLN(39), GLN(40), 3 GLN(41), GLN(42), GLN(43), GLN(44)/ 4 4.84711813518352239D+01, 5.16066755677643736D+01, 5 5.47847293981123192D+01, 5.80036052229805199D+01, 6 6.12617017610020020D+01, 6.45575386270063311D+01, 7 6.78897431371815350D+01, 7.12570389671680090D+01, 8 7.46582363488301644D+01, 7.80922235533153106D+01, 9 8.15579594561150372D+01, 8.50544670175815174D+01, A 8.85808275421976788D+01, 9.21361756036870925D+01, B 9.57196945421432025D+01, 9.93306124547874269D+01, C 1.02968198614513813D+02, 1.06631760260643459D+02, D 1.10320639714757395D+02, 1.14034211781461703D+02, E 1.17771881399745072D+02, 1.21533081515438634D+02/ DATA GLN(45), GLN(46), GLN(47), GLN(48), GLN(49), GLN(50), 1 GLN(51), GLN(52), GLN(53), GLN(54), GLN(55), GLN(56), 2 GLN(57), GLN(58), GLN(59), GLN(60), GLN(61), GLN(62), 3 GLN(63), GLN(64), GLN(65), GLN(66)/ 4 1.25317271149356895D+02, 1.29123933639127215D+02, 5 1.32952575035616310D+02, 1.36802722637326368D+02, 6 1.40673923648234259D+02, 1.44565743946344886D+02, 7 1.48477766951773032D+02, 1.52409592584497358D+02, 8 1.56360836303078785D+02, 1.60331128216630907D+02, 9 1.64320112263195181D+02, 1.68327445448427652D+02, A 1.72352797139162802D+02, 1.76395848406997352D+02, B 1.80456291417543771D+02, 1.84533828861449491D+02, C 1.88628173423671591D+02, 1.92739047287844902D+02, D 1.96866181672889994D+02, 2.01009316399281527D+02, E 2.05168199482641199D+02, 2.09342586752536836D+02/ DATA GLN(67), GLN(68), GLN(69), GLN(70), GLN(71), GLN(72), 1 GLN(73), GLN(74), GLN(75), GLN(76), GLN(77), GLN(78), 2 GLN(79), GLN(80), GLN(81), GLN(82), GLN(83), GLN(84), 3 GLN(85), GLN(86), GLN(87), GLN(88)/ 4 2.13532241494563261D+02, 2.17736934113954227D+02, 5 2.21956441819130334D+02, 2.26190548323727593D+02, 6 2.30439043565776952D+02, 2.34701723442818268D+02, 7 2.38978389561834323D+02, 2.43268849002982714D+02, 8 2.47572914096186884D+02, 2.51890402209723194D+02, 9 2.56221135550009525D+02, 2.60564940971863209D+02, A 2.64921649798552801D+02, 2.69291097651019823D+02, B 2.73673124285693704D+02, 2.78067573440366143D+02, C 2.82474292687630396D+02, 2.86893133295426994D+02, D 2.91323950094270308D+02, 2.95766601350760624D+02, E 3.00220948647014132D+02, 3.04686856765668715D+02/ DATA GLN(89), GLN(90), GLN(91), GLN(92), GLN(93), GLN(94), 1 GLN(95), GLN(96), GLN(97), GLN(98), GLN(99), GLN(100)/ 2 3.09164193580146922D+02, 3.13652829949879062D+02, 3 3.18152639620209327D+02, 3.22663499126726177D+02, 4 3.27185287703775217D+02, 3.31717887196928473D+02, 5 3.36261181979198477D+02, 3.40815058870799018D+02, 6 3.45379407062266854D+02, 3.49954118040770237D+02, 7 3.54539085519440809D+02, 3.59134205369575399D+02/ C COEFFICIENTS OF ASYMPTOTIC EXPANSION DATA CF(1), CF(2), CF(3), CF(4), CF(5), CF(6), CF(7), CF(8), 1 CF(9), CF(10), CF(11), CF(12), CF(13), CF(14), CF(15), 2 CF(16), CF(17), CF(18), CF(19), CF(20), CF(21), CF(22)/ 3 8.33333333333333333D-02, -2.77777777777777778D-03, 4 7.93650793650793651D-04, -5.95238095238095238D-04, 5 8.41750841750841751D-04, -1.91752691752691753D-03, 6 6.41025641025641026D-03, -2.95506535947712418D-02, 7 1.79644372368830573D-01, -1.39243221690590112D+00, 8 1.34028640441683920D+01, -1.56848284626002017D+02, 9 2.19310333333333333D+03, -3.61087712537249894D+04, A 6.91472268851313067D+05, -1.52382215394074162D+07, B 3.82900751391414141D+08, -1.08822660357843911D+10, C 3.47320283765002252D+11, -1.23696021422692745D+13, D 4.88788064793079335D+14, -2.13203339609193739D+16/ C C LN(2*PI) DATA CON / 1.83787706640934548D+00/ C C***FIRST EXECUTABLE STATEMENT DGAMLN IERR=0 IF (Z.LE.0.0D0) GO TO 70 IF (Z.GT.101.0D0) GO TO 10 NZ = Z FZ = Z - NZ IF (FZ.GT.0.0D0) GO TO 10 IF (NZ.GT.100) GO TO 10 DGAMLN = GLN(NZ) RETURN 10 CONTINUE WDTOL = D1MACH(4) WDTOL = MAX(WDTOL,0.5D-18) I1M = I1MACH(14) RLN = D1MACH(5)*I1M FLN = MIN(RLN,20.0D0) FLN = MAX(FLN,3.0D0) FLN = FLN - 3.0D0 ZM = 1.8000D0 + 0.3875D0*FLN MZ = ZM + 1 ZMIN = MZ ZDMY = Z ZINC = 0.0D0 IF (Z.GE.ZMIN) GO TO 20 ZINC = ZMIN - NZ ZDMY = Z + ZINC 20 CONTINUE ZP = 1.0D0/ZDMY T1 = CF(1)*ZP S = T1 IF (ZP.LT.WDTOL) GO TO 40 ZSQ = ZP*ZP TST = T1*WDTOL DO 30 K=2,22 ZP = ZP*ZSQ TRM = CF(K)*ZP IF (ABS(TRM).LT.TST) GO TO 40 S = S + TRM 30 CONTINUE 40 CONTINUE IF (ZINC.NE.0.0D0) GO TO 50 TLG = LOG(Z) DGAMLN = Z*(TLG-1.0D0) + 0.5D0*(CON-TLG) + S RETURN 50 CONTINUE ZP = 1.0D0 NZ = ZINC DO 60 I=1,NZ ZP = ZP*(Z+(I-1)) 60 CONTINUE TLG = LOG(ZDMY) DGAMLN = ZDMY*(TLG-1.0D0) - LOG(ZP) + 0.5D0*(CON-TLG) + S RETURN C C 70 CONTINUE DGAMLN = D1MACH(2) IERR=1 RETURN END