SUBROUTINE CALJY0(ARG,RESULT,JINT) C--------------------------------------------------------------------- C C This packet computes zero-order Bessel functions of the first and C second kind (J0 and Y0), for real arguments X, where 0 < X <= XMAX C for Y0, and |X| <= XMAX for J0. It contains two function-type C subprograms, BESJ0 and BESY0, and one subroutine-type C subprogram, CALJY0. The calling statements for the primary C entries are: C C Y = BESJ0(X) C and C Y = BESY0(X), C C where the entry points correspond to the functions J0(X) and Y0(X), C respectively. The routine CALJY0 is intended for internal packet C use only, all computations within the packet being concentrated in C this one routine. The function subprograms invoke CALJY0 with C the statement C CALL CALJY0(ARG,RESULT,JINT), C where the parameter usage is as follows: C C Function Parameters for CALJY0 C call ARG RESULT JINT C C BESJ0(ARG) |ARG| .LE. XMAX J0(ARG) 0 C BESY0(ARG) 0 .LT. ARG .LE. XMAX Y0(ARG) 1 C C The main computation uses unpublished minimax rational C approximations for X .LE. 8.0, and an approximation from the C book Computer Approximations by Hart, et. al., Wiley and Sons, C New York, 1968, for arguments larger than 8.0 Part of this C transportable packet is patterned after the machine-dependent C FUNPACK program BESJ0(X), but cannot match that version for C efficiency or accuracy. This version uses rational functions C that are theoretically accurate to at least 18 significant decimal C digits for X <= 8, and at least 18 decimal places for X > 8. The C accuracy achieved depends on the arithmetic system, the compiler, C the intrinsic functions, and proper selection of the machine- C dependent constants. C C******************************************************************* C C Explanation of machine-dependent constants C C XINF = largest positive machine number C XMAX = largest acceptable argument. The functions AINT, SIN C and COS must perform properly for ABS(X) .LE. XMAX. C We recommend that XMAX be a small integer multiple of C sqrt(1/eps), where eps is the smallest positive number C such that 1+eps > 1. C XSMALL = positive argument such that 1.0-(X/2)**2 = 1.0 C to machine precision for all ABS(X) .LE. XSMALL. C We recommend that XSMALL < sqrt(eps)/beta, where beta C is the floating-point radix (usually 2 or 16). C C Approximate values for some important machines are C C eps XMAX XSMALL XINF C C CDC 7600 (S.P.) 7.11E-15 1.34E+08 2.98E-08 1.26E+322 C CRAY-1 (S.P.) 7.11E-15 1.34E+08 2.98E-08 5.45E+2465 C IBM PC (8087) (S.P.) 5.96E-08 8.19E+03 1.22E-04 3.40E+38 C IBM PC (8087) (D.P.) 1.11D-16 2.68D+08 3.72D-09 1.79D+308 C IBM 195 (D.P.) 2.22D-16 6.87D+09 9.09D-13 7.23D+75 C UNIVAC 1108 (D.P.) 1.73D-18 4.30D+09 2.33D-10 8.98D+307 C VAX 11/780 (D.P.) 1.39D-17 1.07D+09 9.31D-10 1.70D+38 C C******************************************************************* C******************************************************************* C C Error Returns C C The program returns the value zero for X .GT. XMAX, and returns C -XINF when BESLY0 is called with a negative or zero argument. C C C Intrinsic functions required are: C C ABS, AINT, COS, LOG, SIN, SQRT C C C Latest modification: June 2, 1989 C C Author: W. J. Cody C Mathematics and Computer Science Division C Argonne National Laboratory C Argonne, IL 60439 C C-------------------------------------------------------------------- INTEGER I,JINT CS REAL CD DOUBLE PRECISION 1 ARG,AX,CONS,DOWN,EIGHT,FIVE5,FOUR,ONE,ONEOV8,PI2,PJ0, 2 PJ1,PLG,PROD,PY0,PY1,PY2,P0,P1,P17,QJ0,QJ1,QLG,QY0,QY1, 3 QY2,Q0,Q1,RESJ,RESULT,R0,R1,SIXTY4,THREE,TWOPI,TWOPI1, 4 TWOPI2,TWO56,UP,W,WSQ,XDEN,XINF,XMAX,XNUM,XSMALL,XJ0, 5 XJ1,XJ01,XJ02,XJ11,XJ12,XY,XY0,XY01,XY02,XY1,XY11,XY12, 6 XY2,XY21,XY22,Z,ZERO,ZSQ DIMENSION PJ0(7),PJ1(8),PLG(4),PY0(6),PY1(7),PY2(8),P0(6),P1(6), 1 QJ0(5),QJ1(7),QLG(4),QY0(5),QY1(6),QY2(7),Q0(5),Q1(5) C------------------------------------------------------------------- C Mathematical constants C CONS = ln(.5) + Euler's gamma C------------------------------------------------------------------- CS DATA ZERO,ONE,THREE,FOUR,EIGHT/0.0E0,1.0E0,3.0E0,4.0E0,8.0E0/, CS 1 FIVE5,SIXTY4,ONEOV8,P17/5.5E0,64.0E0,0.125E0,1.716E-1/, CS 2 TWO56,CONS/256.0E0,-1.1593151565841244881E-1/, CS 3 PI2,TWOPI/6.3661977236758134308E-1,6.2831853071795864769E0/, CS 4 TWOPI1,TWOPI2/6.28125E0,1.9353071795864769253E-3/ CD DATA ZERO,ONE,THREE,FOUR,EIGHT/0.0D0,1.0D0,3.0D0,4.0D0,8.0D0/, CD 1 FIVE5,SIXTY4,ONEOV8,P17/5.5D0,64.0D0,0.125D0,1.716D-1/, CD 2 TWO56,CONS/256.0D0,-1.1593151565841244881D-1/, CD 3 PI2,TWOPI/6.3661977236758134308D-1,6.2831853071795864769D0/, CD 4 TWOPI1,TWOPI2/6.28125D0,1.9353071795864769253D-3/ C------------------------------------------------------------------- C Machine-dependent constants C------------------------------------------------------------------- CS DATA XMAX/8.19E+03/,XSMALL/1.22E-09/,XINF/1.7E+38/ CD DATA XMAX/1.07D+09/,XSMALL/9.31D-10/,XINF/1.7D+38/ C------------------------------------------------------------------- C Zeroes of Bessel functions C------------------------------------------------------------------- CS DATA XJ0/2.4048255576957727686E+0/,XJ1/5.5200781102863106496E+0/, CS 1 XY0/8.9357696627916752158E-1/,XY1/3.9576784193148578684E+0/, CS 2 XY2/7.0860510603017726976E+0/, CS 3 XJ01/ 616.0E+0/, XJ02/-1.4244423042272313784E-03/, CS 4 XJ11/1413.0E+0/, XJ12/ 5.4686028631064959660E-04/, CS 5 XY01/ 228.0E+0/, XY02/ 2.9519662791675215849E-03/, CS 6 XY11/1013.0E+0/, XY12/ 6.4716931485786837568E-04/, CS 7 XY21/1814.0E+0/, XY22/ 1.1356030177269762362E-04/ CD DATA XJ0/2.4048255576957727686D+0/,XJ1/5.5200781102863106496D+0/, CD 1 XY0/8.9357696627916752158D-1/,XY1/3.9576784193148578684D+0/, CD 2 XY2/7.0860510603017726976D+0/, CD 3 XJ01/ 616.0D+0/, XJ02/-1.4244423042272313784D-03/, CD 4 XJ11/1413.0D+0/, XJ12/ 5.4686028631064959660D-04/, CD 5 XY01/ 228.0D+0/, XY02/ 2.9519662791675215849D-03/, CD 6 XY11/1013.0D+0/, XY12/ 6.4716931485786837568D-04/, CD 7 XY21/1814.0D+0/, XY22/ 1.1356030177269762362D-04/ C------------------------------------------------------------------- C Coefficients for rational approximation to ln(x/a) C-------------------------------------------------------------------- CS DATA PLG/-2.4562334077563243311E+01,2.3642701335621505212E+02, CS 1 -5.4989956895857911039E+02,3.5687548468071500413E+02/ CS DATA QLG/-3.5553900764052419184E+01,1.9400230218539473193E+02, CS 1 -3.3442903192607538956E+02,1.7843774234035750207E+02/ CD DATA PLG/-2.4562334077563243311D+01,2.3642701335621505212D+02, CD 1 -5.4989956895857911039D+02,3.5687548468071500413D+02/ CD DATA QLG/-3.5553900764052419184D+01,1.9400230218539473193D+02, CD 1 -3.3442903192607538956D+02,1.7843774234035750207D+02/ C------------------------------------------------------------------- C Coefficients for rational approximation of C J0(X) / (X**2 - XJ0**2), XSMALL < |X| <= 4.0 C-------------------------------------------------------------------- CS DATA PJ0/6.6302997904833794242E+06,-6.2140700423540120665E+08, CS 1 2.7282507878605942706E+10,-4.1298668500990866786E+11, CS 2 -1.2117036164593528341E-01, 1.0344222815443188943E+02, CS 3 -3.6629814655107086448E+04/ CS DATA QJ0/4.5612696224219938200E+05, 1.3985097372263433271E+08, CS 1 2.6328198300859648632E+10, 2.3883787996332290397E+12, CS 2 9.3614022392337710626E+02/ CD DATA PJ0/6.6302997904833794242D+06,-6.2140700423540120665D+08, CD 1 2.7282507878605942706D+10,-4.1298668500990866786D+11, CD 2 -1.2117036164593528341D-01, 1.0344222815443188943D+02, CD 3 -3.6629814655107086448D+04/ CD DATA QJ0/4.5612696224219938200D+05, 1.3985097372263433271D+08, CD 1 2.6328198300859648632D+10, 2.3883787996332290397D+12, CD 2 9.3614022392337710626D+02/ C------------------------------------------------------------------- C Coefficients for rational approximation of C J0(X) / (X**2 - XJ1**2), 4.0 < |X| <= 8.0 C------------------------------------------------------------------- CS DATA PJ1/4.4176707025325087628E+03, 1.1725046279757103576E+04, CS 1 1.0341910641583726701E+04,-7.2879702464464618998E+03, CS 2 -1.2254078161378989535E+04,-1.8319397969392084011E+03, CS 3 4.8591703355916499363E+01, 7.4321196680624245801E+02/ CS DATA QJ1/3.3307310774649071172E+02,-2.9458766545509337327E+03, CS 1 1.8680990008359188352E+04,-8.4055062591169562211E+04, CS 2 2.4599102262586308984E+05,-3.5783478026152301072E+05, CS 3 -2.5258076240801555057E+01/ CD DATA PJ1/4.4176707025325087628D+03, 1.1725046279757103576D+04, CD 1 1.0341910641583726701D+04,-7.2879702464464618998D+03, CD 2 -1.2254078161378989535D+04,-1.8319397969392084011D+03, CD 3 4.8591703355916499363D+01, 7.4321196680624245801D+02/ CD DATA QJ1/3.3307310774649071172D+02,-2.9458766545509337327D+03, CD 1 1.8680990008359188352D+04,-8.4055062591169562211D+04, CD 2 2.4599102262586308984D+05,-3.5783478026152301072D+05, CD 3 -2.5258076240801555057D+01/ C------------------------------------------------------------------- C Coefficients for rational approximation of C (Y0(X) - 2 LN(X/XY0) J0(X)) / (X**2 - XY0**2), C XSMALL < |X| <= 3.0 C-------------------------------------------------------------------- CS DATA PY0/1.0102532948020907590E+04,-2.1287548474401797963E+06, CS 1 2.0422274357376619816E+08,-8.3716255451260504098E+09, CS 2 1.0723538782003176831E+11,-1.8402381979244993524E+01/ CS DATA QY0/6.6475986689240190091E+02, 2.3889393209447253406E+05, CS 1 5.5662956624278251596E+07, 8.1617187777290363573E+09, CS 2 5.8873865738997033405E+11/ CD DATA PY0/1.0102532948020907590D+04,-2.1287548474401797963D+06, CD 1 2.0422274357376619816D+08,-8.3716255451260504098D+09, CD 2 1.0723538782003176831D+11,-1.8402381979244993524D+01/ CD DATA QY0/6.6475986689240190091D+02, 2.3889393209447253406D+05, CD 1 5.5662956624278251596D+07, 8.1617187777290363573D+09, CD 2 5.8873865738997033405D+11/ C------------------------------------------------------------------- C Coefficients for rational approximation of C (Y0(X) - 2 LN(X/XY1) J0(X)) / (X**2 - XY1**2), C 3.0 < |X| <= 5.5 C-------------------------------------------------------------------- CS DATA PY1/-1.4566865832663635920E+04, 4.6905288611678631510E+06, CS 1 -6.9590439394619619534E+08, 4.3600098638603061642E+10, CS 2 -5.5107435206722644429E+11,-2.2213976967566192242E+13, CS 3 1.7427031242901594547E+01/ CS DATA QY1/ 8.3030857612070288823E+02, 4.0669982352539552018E+05, CS 1 1.3960202770986831075E+08, 3.4015103849971240096E+10, CS 2 5.4266824419412347550E+12, 4.3386146580707264428E+14/ CD DATA PY1/-1.4566865832663635920D+04, 4.6905288611678631510D+06, CD 1 -6.9590439394619619534D+08, 4.3600098638603061642D+10, CD 2 -5.5107435206722644429D+11,-2.2213976967566192242D+13, CD 3 1.7427031242901594547D+01/ CD DATA QY1/ 8.3030857612070288823D+02, 4.0669982352539552018D+05, CD 1 1.3960202770986831075D+08, 3.4015103849971240096D+10, CD 2 5.4266824419412347550D+12, 4.3386146580707264428D+14/ C------------------------------------------------------------------- C Coefficients for rational approximation of C (Y0(X) - 2 LN(X/XY2) J0(X)) / (X**2 - XY2**2), C 5.5 < |X| <= 8.0 C-------------------------------------------------------------------- CS DATA PY2/ 2.1363534169313901632E+04,-1.0085539923498211426E+07, CS 1 2.1958827170518100757E+09,-1.9363051266772083678E+11, CS 2 -1.2829912364088687306E+11, 6.7016641869173237784E+14, CS 3 -8.0728726905150210443E+15,-1.7439661319197499338E+01/ CS DATA QY2/ 8.7903362168128450017E+02, 5.3924739209768057030E+05, CS 1 2.4727219475672302327E+08, 8.6926121104209825246E+10, CS 2 2.2598377924042897629E+13, 3.9272425569640309819E+15, CS 3 3.4563724628846457519E+17/ CD DATA PY2/ 2.1363534169313901632D+04,-1.0085539923498211426D+07, CD 1 2.1958827170518100757D+09,-1.9363051266772083678D+11, CD 2 -1.2829912364088687306D+11, 6.7016641869173237784D+14, CD 3 -8.0728726905150210443D+15,-1.7439661319197499338D+01/ CD DATA QY2/ 8.7903362168128450017D+02, 5.3924739209768057030D+05, CD 1 2.4727219475672302327D+08, 8.6926121104209825246D+10, CD 2 2.2598377924042897629D+13, 3.9272425569640309819D+15, CD 3 3.4563724628846457519D+17/ C------------------------------------------------------------------- C Coefficients for Hart,s approximation, |X| > 8.0 C------------------------------------------------------------------- CS DATA P0/3.4806486443249270347E+03, 2.1170523380864944322E+04, CS 1 4.1345386639580765797E+04, 2.2779090197304684302E+04, CS 2 8.8961548424210455236E-01, 1.5376201909008354296E+02/ CS DATA Q0/3.5028735138235608207E+03, 2.1215350561880115730E+04, CS 1 4.1370412495510416640E+04, 2.2779090197304684318E+04, CS 2 1.5711159858080893649E+02/ CS DATA P1/-2.2300261666214198472E+01,-1.1183429920482737611E+02, CS 1 -1.8591953644342993800E+02,-8.9226600200800094098E+01, CS 2 -8.8033303048680751817E-03,-1.2441026745835638459E+00/ CS DATA Q1/1.4887231232283756582E+03, 7.2642780169211018836E+03, CS 1 1.1951131543434613647E+04, 5.7105024128512061905E+03, CS 2 9.0593769594993125859E+01/ CD DATA P0/3.4806486443249270347D+03, 2.1170523380864944322D+04, CD 1 4.1345386639580765797D+04, 2.2779090197304684302D+04, CD 2 8.8961548424210455236D-01, 1.5376201909008354296D+02/ CD DATA Q0/3.5028735138235608207D+03, 2.1215350561880115730D+04, CD 1 4.1370412495510416640D+04, 2.2779090197304684318D+04, CD 2 1.5711159858080893649D+02/ CD DATA P1/-2.2300261666214198472D+01,-1.1183429920482737611D+02, CD 1 -1.8591953644342993800D+02,-8.9226600200800094098D+01, CD 2 -8.8033303048680751817D-03,-1.2441026745835638459D+00/ CD DATA Q1/1.4887231232283756582D+03, 7.2642780169211018836D+03, CD 1 1.1951131543434613647D+04, 5.7105024128512061905D+03, CD 2 9.0593769594993125859D+01/ C------------------------------------------------------------------- C Check for error conditions C------------------------------------------------------------------- AX = ABS(ARG) IF ((JINT .EQ. 1) .AND. (ARG .LE. ZERO)) THEN RESULT = -XINF GO TO 2000 ELSE IF (AX .GT. XMAX) THEN RESULT = ZERO GO TO 2000 END IF IF (AX .GT. EIGHT) GO TO 800 IF (AX .LE. XSMALL) THEN IF (JINT .EQ. 0) THEN RESULT = ONE ELSE RESULT = PI2 * (LOG(AX) + CONS) END IF GO TO 2000 END IF C------------------------------------------------------------------- C Calculate J0 for appropriate interval, preserving C accuracy near the zero of J0 C------------------------------------------------------------------- ZSQ = AX * AX IF (AX .LE. FOUR) THEN XNUM = (PJ0(5) * ZSQ + PJ0(6)) * ZSQ + PJ0(7) XDEN = ZSQ + QJ0(5) DO 50 I = 1, 4 XNUM = XNUM * ZSQ + PJ0(I) XDEN = XDEN * ZSQ + QJ0(I) 50 CONTINUE PROD = ((AX - XJ01/TWO56) - XJ02) * (AX + XJ0) ELSE WSQ = ONE - ZSQ / SIXTY4 XNUM = PJ1(7) * WSQ + PJ1(8) XDEN = WSQ + QJ1(7) DO 220 I = 1, 6 XNUM = XNUM * WSQ + PJ1(I) XDEN = XDEN * WSQ + QJ1(I) 220 CONTINUE PROD = (AX + XJ1) * ((AX - XJ11/TWO56) - XJ12) END IF RESULT = PROD * XNUM / XDEN IF (JINT .EQ. 0) GO TO 2000 C------------------------------------------------------------------- C Calculate Y0. First find RESJ = pi/2 ln(x/xn) J0(x), C where xn is a zero of Y0 C------------------------------------------------------------------- IF (AX .LE. THREE) THEN UP = (AX-XY01/TWO56)-XY02 XY = XY0 ELSE IF (AX .LE. FIVE5) THEN UP = (AX-XY11/TWO56)-XY12 XY = XY1 ELSE UP = (AX-XY21/TWO56)-XY22 XY = XY2 END IF DOWN = AX + XY IF (ABS(UP) .LT. P17*DOWN) THEN W = UP/DOWN WSQ = W*W XNUM = PLG(1) XDEN = WSQ + QLG(1) DO 320 I = 2, 4 XNUM = XNUM*WSQ + PLG(I) XDEN = XDEN*WSQ + QLG(I) 320 CONTINUE RESJ = PI2 * RESULT * W * XNUM/XDEN ELSE RESJ = PI2 * RESULT * LOG(AX/XY) END IF C------------------------------------------------------------------- C Now calculate Y0 for appropriate interval, preserving C accuracy near the zero of Y0 C------------------------------------------------------------------- IF (AX .LE. THREE) THEN XNUM = PY0(6) * ZSQ + PY0(1) XDEN = ZSQ + QY0(1) DO 340 I = 2, 5 XNUM = XNUM * ZSQ + PY0(I) XDEN = XDEN * ZSQ + QY0(I) 340 CONTINUE ELSE IF (AX .LE. FIVE5) THEN XNUM = PY1(7) * ZSQ + PY1(1) XDEN = ZSQ + QY1(1) DO 360 I = 2, 6 XNUM = XNUM * ZSQ + PY1(I) XDEN = XDEN * ZSQ + QY1(I) 360 CONTINUE ELSE XNUM = PY2(8) * ZSQ + PY2(1) XDEN = ZSQ + QY2(1) DO 380 I = 2, 7 XNUM = XNUM * ZSQ + PY2(I) XDEN = XDEN * ZSQ + QY2(I) 380 CONTINUE END IF RESULT = RESJ + UP * DOWN * XNUM / XDEN GO TO 2000 C------------------------------------------------------------------- C Calculate J0 or Y0 for |ARG| > 8.0 C------------------------------------------------------------------- 800 Z = EIGHT / AX W = AX / TWOPI W = AINT(W) + ONEOV8 W = (AX - W * TWOPI1) - W * TWOPI2 ZSQ = Z * Z XNUM = P0(5) * ZSQ + P0(6) XDEN = ZSQ + Q0(5) UP = P1(5) * ZSQ + P1(6) DOWN = ZSQ + Q1(5) DO 850 I = 1, 4 XNUM = XNUM * ZSQ + P0(I) XDEN = XDEN * ZSQ + Q0(I) UP = UP * ZSQ + P1(I) DOWN = DOWN * ZSQ + Q1(I) 850 CONTINUE R0 = XNUM / XDEN R1 = UP / DOWN IF (JINT .EQ. 0) THEN RESULT = SQRT(PI2/AX) * (R0*COS(W) - Z*R1*SIN(W)) ELSE RESULT = SQRT(PI2/AX) * (R0*SIN(W) + Z*R1*COS(W)) END IF 2000 RETURN C---------- Last line of CALJY0 ---------- END CD DOUBLE PRECISION FUNCTION BESJ0(X) CS REAL FUNCTION BESJ0(X) C-------------------------------------------------------------------- C C This subprogram computes approximate values for Bessel functions C of the first kind of order zero for arguments |X| <= XMAX C (see comments heading CALJY0). C C-------------------------------------------------------------------- INTEGER JINT CS REAL X, RESULT CD DOUBLE PRECISION X, RESULT C-------------------------------------------------------------------- JINT=0 CALL CALJY0(X,RESULT,JINT) BESJ0 = RESULT RETURN C---------- Last line of BESJ0 ---------- END CD DOUBLE PRECISION FUNCTION BESY0(X) CS REAL FUNCTION BESY0(X) C-------------------------------------------------------------------- C C This subprogram computes approximate values for Bessel functions C of the second kind of order zero for arguments 0 < X <= XMAX C (see comments heading CALJY0). C C-------------------------------------------------------------------- INTEGER JINT CS REAL X, RESULT CD DOUBLE PRECISION X, RESULT C-------------------------------------------------------------------- JINT=1 CALL CALJY0(X,RESULT,JINT) BESY0 = RESULT RETURN C---------- Last line of BESY0 ---------- END