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1.1 ! root 1: /* @(#)j1.c 4.1 12/25/82 */ ! 2: ! 3: /* ! 4: floating point Bessel's function ! 5: of the first and second kinds ! 6: of order one ! 7: ! 8: j1(x) returns the value of J1(x) ! 9: for all real values of x. ! 10: ! 11: There are no error returns. ! 12: Calls sin, cos, sqrt. ! 13: ! 14: There is a niggling bug in J1 which ! 15: causes errors up to 2e-16 for x in the ! 16: interval [-8,8]. ! 17: The bug is caused by an inappropriate order ! 18: of summation of the series. rhm will fix it ! 19: someday. ! 20: ! 21: Coefficients are from Hart & Cheney. ! 22: #6050 (20.98D) ! 23: #6750 (19.19D) ! 24: #7150 (19.35D) ! 25: ! 26: y1(x) returns the value of Y1(x) ! 27: for positive real values of x. ! 28: For x<=0, error number EDOM is set and a ! 29: large negative value is returned. ! 30: ! 31: Calls sin, cos, sqrt, log, j1. ! 32: ! 33: The values of Y1 have not been checked ! 34: to more than ten places. ! 35: ! 36: Coefficients are from Hart & Cheney. ! 37: #6447 (22.18D) ! 38: #6750 (19.19D) ! 39: #7150 (19.35D) ! 40: */ ! 41: ! 42: #include <math.h> ! 43: #include <errno.h> ! 44: ! 45: int errno; ! 46: static double pzero, qzero; ! 47: static double tpi = .6366197723675813430755350535e0; ! 48: static double pio4 = .7853981633974483096156608458e0; ! 49: static double p1[] = { ! 50: 0.581199354001606143928050809e21, ! 51: -.6672106568924916298020941484e20, ! 52: 0.2316433580634002297931815435e19, ! 53: -.3588817569910106050743641413e17, ! 54: 0.2908795263834775409737601689e15, ! 55: -.1322983480332126453125473247e13, ! 56: 0.3413234182301700539091292655e10, ! 57: -.4695753530642995859767162166e7, ! 58: 0.2701122710892323414856790990e4, ! 59: }; ! 60: static double q1[] = { ! 61: 0.1162398708003212287858529400e22, ! 62: 0.1185770712190320999837113348e20, ! 63: 0.6092061398917521746105196863e17, ! 64: 0.2081661221307607351240184229e15, ! 65: 0.5243710262167649715406728642e12, ! 66: 0.1013863514358673989967045588e10, ! 67: 0.1501793594998585505921097578e7, ! 68: 0.1606931573481487801970916749e4, ! 69: 1.0, ! 70: }; ! 71: static double p2[] = { ! 72: -.4435757816794127857114720794e7, ! 73: -.9942246505077641195658377899e7, ! 74: -.6603373248364939109255245434e7, ! 75: -.1523529351181137383255105722e7, ! 76: -.1098240554345934672737413139e6, ! 77: -.1611616644324610116477412898e4, ! 78: 0.0, ! 79: }; ! 80: static double q2[] = { ! 81: -.4435757816794127856828016962e7, ! 82: -.9934124389934585658967556309e7, ! 83: -.6585339479723087072826915069e7, ! 84: -.1511809506634160881644546358e7, ! 85: -.1072638599110382011903063867e6, ! 86: -.1455009440190496182453565068e4, ! 87: 1.0, ! 88: }; ! 89: static double p3[] = { ! 90: 0.3322091340985722351859704442e5, ! 91: 0.8514516067533570196555001171e5, ! 92: 0.6617883658127083517939992166e5, ! 93: 0.1849426287322386679652009819e5, ! 94: 0.1706375429020768002061283546e4, ! 95: 0.3526513384663603218592175580e2, ! 96: 0.0, ! 97: }; ! 98: static double q3[] = { ! 99: 0.7087128194102874357377502472e6, ! 100: 0.1819458042243997298924553839e7, ! 101: 0.1419460669603720892855755253e7, ! 102: 0.4002944358226697511708610813e6, ! 103: 0.3789022974577220264142952256e5, ! 104: 0.8638367769604990967475517183e3, ! 105: 1.0, ! 106: }; ! 107: static double p4[] = { ! 108: -.9963753424306922225996744354e23, ! 109: 0.2655473831434854326894248968e23, ! 110: -.1212297555414509577913561535e22, ! 111: 0.2193107339917797592111427556e20, ! 112: -.1965887462722140658820322248e18, ! 113: 0.9569930239921683481121552788e15, ! 114: -.2580681702194450950541426399e13, ! 115: 0.3639488548124002058278999428e10, ! 116: -.2108847540133123652824139923e7, ! 117: 0.0, ! 118: }; ! 119: static double q4[] = { ! 120: 0.5082067366941243245314424152e24, ! 121: 0.5435310377188854170800653097e22, ! 122: 0.2954987935897148674290758119e20, ! 123: 0.1082258259408819552553850180e18, ! 124: 0.2976632125647276729292742282e15, ! 125: 0.6465340881265275571961681500e12, ! 126: 0.1128686837169442121732366891e10, ! 127: 0.1563282754899580604737366452e7, ! 128: 0.1612361029677000859332072312e4, ! 129: 1.0, ! 130: }; ! 131: ! 132: double ! 133: j1(arg) double arg;{ ! 134: double xsq, n, d, x; ! 135: double sin(), cos(), sqrt(); ! 136: int i; ! 137: ! 138: x = arg; ! 139: if(x < 0.) x = -x; ! 140: if(x > 8.){ ! 141: asympt(x); ! 142: n = x - 3.*pio4; ! 143: n = sqrt(tpi/x)*(pzero*cos(n) - qzero*sin(n)); ! 144: if(arg <0.) n = -n; ! 145: return(n); ! 146: } ! 147: xsq = x*x; ! 148: for(n=0,d=0,i=8;i>=0;i--){ ! 149: n = n*xsq + p1[i]; ! 150: d = d*xsq + q1[i]; ! 151: } ! 152: return(arg*n/d); ! 153: } ! 154: ! 155: double ! 156: y1(arg) double arg;{ ! 157: double xsq, n, d, x; ! 158: double sin(), cos(), sqrt(), log(), j1(); ! 159: int i; ! 160: ! 161: errno = 0; ! 162: x = arg; ! 163: if(x <= 0.){ ! 164: errno = EDOM; ! 165: return(-HUGE); ! 166: } ! 167: if(x > 8.){ ! 168: asympt(x); ! 169: n = x - 3*pio4; ! 170: return(sqrt(tpi/x)*(pzero*sin(n) + qzero*cos(n))); ! 171: } ! 172: xsq = x*x; ! 173: for(n=0,d=0,i=9;i>=0;i--){ ! 174: n = n*xsq + p4[i]; ! 175: d = d*xsq + q4[i]; ! 176: } ! 177: return(x*n/d + tpi*(j1(x)*log(x)-1./x)); ! 178: } ! 179: ! 180: static ! 181: asympt(arg) double arg;{ ! 182: double zsq, n, d; ! 183: int i; ! 184: zsq = 64./(arg*arg); ! 185: for(n=0,d=0,i=6;i>=0;i--){ ! 186: n = n*zsq + p2[i]; ! 187: d = d*zsq + q2[i]; ! 188: } ! 189: pzero = n/d; ! 190: for(n=0,d=0,i=6;i>=0;i--){ ! 191: n = n*zsq + p3[i]; ! 192: d = d*zsq + q3[i]; ! 193: } ! 194: qzero = (8./arg)*(n/d); ! 195: }
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