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1.1 ! root 1: /* ! 2: floating point Bessel's function ! 3: of the first and second kinds ! 4: of order zero ! 5: ! 6: j0(x) returns the value of J0(x) ! 7: for all real values of x. ! 8: ! 9: There are no error returns. ! 10: Calls sin, cos, sqrt. ! 11: ! 12: There is a niggling bug in J0 which ! 13: causes errors up to 2e-16 for x in the ! 14: interval [-8,8]. ! 15: The bug is caused by an inappropriate order ! 16: of summation of the series. rhm will fix it ! 17: someday. ! 18: ! 19: Coefficients are from Hart & Cheney. ! 20: #5849 (19.22D) ! 21: #6549 (19.25D) ! 22: #6949 (19.41D) ! 23: ! 24: y0(x) returns the value of Y0(x) ! 25: for positive real values of x. ! 26: For x<=0, error number EDOM is set and a ! 27: large negative value is returned. ! 28: ! 29: Calls sin, cos, sqrt, log, j0. ! 30: ! 31: The values of Y0 have not been checked ! 32: to more than ten places. ! 33: ! 34: Coefficients are from Hart & Cheney. ! 35: #6245 (18.78D) ! 36: #6549 (19.25D) ! 37: #6949 (19.41D) ! 38: */ ! 39: ! 40: #include <math.h> ! 41: #include <errno.h> ! 42: ! 43: int errno; ! 44: static double pzero, qzero; ! 45: static double tpi = .6366197723675813430755350535e0; ! 46: static double pio4 = .7853981633974483096156608458e0; ! 47: static double p1[] = { ! 48: 0.4933787251794133561816813446e21, ! 49: -.1179157629107610536038440800e21, ! 50: 0.6382059341072356562289432465e19, ! 51: -.1367620353088171386865416609e18, ! 52: 0.1434354939140344111664316553e16, ! 53: -.8085222034853793871199468171e13, ! 54: 0.2507158285536881945555156435e11, ! 55: -.4050412371833132706360663322e8, ! 56: 0.2685786856980014981415848441e5, ! 57: }; ! 58: static double q1[] = { ! 59: 0.4933787251794133562113278438e21, ! 60: 0.5428918384092285160200195092e19, ! 61: 0.3024635616709462698627330784e17, ! 62: 0.1127756739679798507056031594e15, ! 63: 0.3123043114941213172572469442e12, ! 64: 0.6699987672982239671814028660e9, ! 65: 0.1114636098462985378182402543e7, ! 66: 0.1363063652328970604442810507e4, ! 67: 1.0 ! 68: }; ! 69: static double p2[] = { ! 70: 0.5393485083869438325262122897e7, ! 71: 0.1233238476817638145232406055e8, ! 72: 0.8413041456550439208464315611e7, ! 73: 0.2016135283049983642487182349e7, ! 74: 0.1539826532623911470917825993e6, ! 75: 0.2485271928957404011288128951e4, ! 76: 0.0, ! 77: }; ! 78: static double q2[] = { ! 79: 0.5393485083869438325560444960e7, ! 80: 0.1233831022786324960844856182e8, ! 81: 0.8426449050629797331554404810e7, ! 82: 0.2025066801570134013891035236e7, ! 83: 0.1560017276940030940592769933e6, ! 84: 0.2615700736920839685159081813e4, ! 85: 1.0, ! 86: }; ! 87: static double p3[] = { ! 88: -.3984617357595222463506790588e4, ! 89: -.1038141698748464093880530341e5, ! 90: -.8239066313485606568803548860e4, ! 91: -.2365956170779108192723612816e4, ! 92: -.2262630641933704113967255053e3, ! 93: -.4887199395841261531199129300e1, ! 94: 0.0, ! 95: }; ! 96: static double q3[] = { ! 97: 0.2550155108860942382983170882e6, ! 98: 0.6667454239319826986004038103e6, ! 99: 0.5332913634216897168722255057e6, ! 100: 0.1560213206679291652539287109e6, ! 101: 0.1570489191515395519392882766e5, ! 102: 0.4087714673983499223402830260e3, ! 103: 1.0, ! 104: }; ! 105: static double p4[] = { ! 106: -.2750286678629109583701933175e20, ! 107: 0.6587473275719554925999402049e20, ! 108: -.5247065581112764941297350814e19, ! 109: 0.1375624316399344078571335453e18, ! 110: -.1648605817185729473122082537e16, ! 111: 0.1025520859686394284509167421e14, ! 112: -.3436371222979040378171030138e11, ! 113: 0.5915213465686889654273830069e8, ! 114: -.4137035497933148554125235152e5, ! 115: }; ! 116: static double q4[] = { ! 117: 0.3726458838986165881989980e21, ! 118: 0.4192417043410839973904769661e19, ! 119: 0.2392883043499781857439356652e17, ! 120: 0.9162038034075185262489147968e14, ! 121: 0.2613065755041081249568482092e12, ! 122: 0.5795122640700729537480087915e9, ! 123: 0.1001702641288906265666651753e7, ! 124: 0.1282452772478993804176329391e4, ! 125: 1.0, ! 126: }; ! 127: ! 128: double ! 129: besj0(arg) double arg;{ ! 130: double argsq, n, d; ! 131: double sin(), cos(), sqrt(); ! 132: int i; ! 133: ! 134: if(arg < 0.) arg = -arg; ! 135: if(arg > 8.){ ! 136: asympt(arg); ! 137: n = arg - pio4; ! 138: return(sqrt(tpi/arg)*(pzero*cos(n) - qzero*sin(n))); ! 139: } ! 140: argsq = arg*arg; ! 141: for(n=0,d=0,i=8;i>=0;i--){ ! 142: n = n*argsq + p1[i]; ! 143: d = d*argsq + q1[i]; ! 144: } ! 145: return(n/d); ! 146: } ! 147: ! 148: double ! 149: besy0(arg) double arg;{ ! 150: double argsq, n, d; ! 151: double sin(), cos(), sqrt(), log(), j0(); ! 152: int i; ! 153: ! 154: errno = 0; ! 155: if(arg <= 0.){ ! 156: errno = EDOM; ! 157: return(-HUGE); ! 158: } ! 159: if(arg > 8.){ ! 160: asympt(arg); ! 161: n = arg - pio4; ! 162: return(sqrt(tpi/arg)*(pzero*sin(n) + qzero*cos(n))); ! 163: } ! 164: argsq = arg*arg; ! 165: for(n=0,d=0,i=8;i>=0;i--){ ! 166: n = n*argsq + p4[i]; ! 167: d = d*argsq + q4[i]; ! 168: } ! 169: return(n/d + tpi*j0(arg)*log(arg)); ! 170: } ! 171: ! 172: static ! 173: asympt(arg) double arg;{ ! 174: double zsq, n, d; ! 175: int i; ! 176: zsq = 64./(arg*arg); ! 177: for(n=0,d=0,i=6;i>=0;i--){ ! 178: n = n*zsq + p2[i]; ! 179: d = d*zsq + q2[i]; ! 180: } ! 181: pzero = n/d; ! 182: for(n=0,d=0,i=6;i>=0;i--){ ! 183: n = n*zsq + p3[i]; ! 184: d = d*zsq + q3[i]; ! 185: } ! 186: qzero = (8./arg)*(n/d); ! 187: }
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