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1.1 ! root 1: /* ! 2: * Copyright (c) 1985 Regents of the University of California. ! 3: * All rights reserved. The Berkeley software License Agreement ! 4: * specifies the terms and conditions for redistribution. ! 5: */ ! 6: ! 7: #ifndef lint ! 8: static char sccsid[] = "@(#)erf.c 5.2 (Berkeley) 4/29/88"; ! 9: #endif /* not lint */ ! 10: ! 11: /* ! 12: C program for floating point error function ! 13: ! 14: erf(x) returns the error function of its argument ! 15: erfc(x) returns 1.0-erf(x) ! 16: ! 17: erf(x) is defined by ! 18: ${2 over sqrt(pi)} int from 0 to x e sup {-t sup 2} dt$ ! 19: ! 20: the entry for erfc is provided because of the ! 21: extreme loss of relative accuracy if erf(x) is ! 22: called for large x and the result subtracted ! 23: from 1. (e.g. for x= 10, 12 places are lost). ! 24: ! 25: There are no error returns. ! 26: ! 27: Calls exp. ! 28: ! 29: Coefficients for large x are #5667 from Hart & Cheney (18.72D). ! 30: */ ! 31: ! 32: #define M 7 ! 33: #define N 9 ! 34: static double torp = 1.1283791670955125738961589031; ! 35: static double p1[] = { ! 36: 0.804373630960840172832162e5, ! 37: 0.740407142710151470082064e4, ! 38: 0.301782788536507577809226e4, ! 39: 0.380140318123903008244444e2, ! 40: 0.143383842191748205576712e2, ! 41: -.288805137207594084924010e0, ! 42: 0.007547728033418631287834e0, ! 43: }; ! 44: static double q1[] = { ! 45: 0.804373630960840172826266e5, ! 46: 0.342165257924628539769006e5, ! 47: 0.637960017324428279487120e4, ! 48: 0.658070155459240506326937e3, ! 49: 0.380190713951939403753468e2, ! 50: 0.100000000000000000000000e1, ! 51: 0.0, ! 52: }; ! 53: static double p2[] = { ! 54: 0.18263348842295112592168999e4, ! 55: 0.28980293292167655611275846e4, ! 56: 0.2320439590251635247384768711e4, ! 57: 0.1143262070703886173606073338e4, ! 58: 0.3685196154710010637133875746e3, ! 59: 0.7708161730368428609781633646e2, ! 60: 0.9675807882987265400604202961e1, ! 61: 0.5641877825507397413087057563e0, ! 62: 0.0, ! 63: }; ! 64: static double q2[] = { ! 65: 0.18263348842295112595576438e4, ! 66: 0.495882756472114071495438422e4, ! 67: 0.60895424232724435504633068e4, ! 68: 0.4429612803883682726711528526e4, ! 69: 0.2094384367789539593790281779e4, ! 70: 0.6617361207107653469211984771e3, ! 71: 0.1371255960500622202878443578e3, ! 72: 0.1714980943627607849376131193e2, ! 73: 1.0, ! 74: }; ! 75: ! 76: double ! 77: erf(arg) double arg;{ ! 78: double erfc(); ! 79: int sign; ! 80: double argsq; ! 81: double d, n; ! 82: int i; ! 83: ! 84: sign = 1; ! 85: if(arg < 0.){ ! 86: arg = -arg; ! 87: sign = -1; ! 88: } ! 89: if(arg < 0.5){ ! 90: argsq = arg*arg; ! 91: for(n=0,d=0,i=M-1; i>=0; i--){ ! 92: n = n*argsq + p1[i]; ! 93: d = d*argsq + q1[i]; ! 94: } ! 95: return(sign*torp*arg*n/d); ! 96: } ! 97: if(arg >= 10.) ! 98: return(sign*1.); ! 99: return(sign*(1. - erfc(arg))); ! 100: } ! 101: ! 102: double ! 103: erfc(arg) double arg;{ ! 104: double erf(); ! 105: double exp(); ! 106: double n, d; ! 107: int i; ! 108: ! 109: if(arg < 0.) ! 110: return(2. - erfc(-arg)); ! 111: /* ! 112: if(arg < 0.5) ! 113: return(1. - erf(arg)); ! 114: */ ! 115: if(arg >= 10.) ! 116: return(0.); ! 117: ! 118: for(n=0,d=0,i=N-1; i>=0; i--){ ! 119: n = n*arg + p2[i]; ! 120: d = d*arg + q2[i]; ! 121: } ! 122: return(exp(-arg*arg)*n/d); ! 123: }
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