/* igam.c * * Incomplete gamma integral * * * * SYNOPSIS: * * double a, x, y, igam(); * * y = igam( a, x ); * * DESCRIPTION: * * The function is defined by * * x * - * 1 | | -t a-1 * igam(a,x) = ----- | e t dt. * - | | * | (a) - * 0 * * * In this implementation both arguments must be positive. * The integral is evaluated by either a power series or * continued fraction expansion, depending on the relative * values of a and x. * * ACCURACY: * * Relative error: * arithmetic domain # trials peak rms * IEEE 0,30 200000 3.6e-14 2.9e-15 * IEEE 0,100 300000 9.9e-14 1.5e-14 */ /* igamc() * * Complemented incomplete gamma integral * * * * SYNOPSIS: * * double a, x, y, igamc(); * * y = igamc( a, x ); * * DESCRIPTION: * * The function is defined by * * * igamc(a,x) = 1 - igam(a,x) * * inf. * - * 1 | | -t a-1 * = ----- | e t dt. * - | | * | (a) - * x * * * In this implementation both arguments must be positive. * The integral is evaluated by either a power series or * continued fraction expansion, depending on the relative * values of a and x. * * ACCURACY: * * Tested at random a, x. * a x Relative error: * arithmetic domain domain # trials peak rms * IEEE 0.5,100 0,100 200000 1.9e-14 1.7e-15 * IEEE 0.01,0.5 0,100 200000 1.4e-13 1.6e-15 */ /* Cephes Math Library Release 2.8: June, 2000 Copyright 1985, 1987, 2000 by Stephen L. Moshier */ #include "mconf.h" #ifdef ANSIPROT extern double lgam ( double ); extern double exp ( double ); extern double log ( double ); extern double fabs ( double ); extern double igam ( double, double ); extern double igamc ( double, double ); #else double lgam(), exp(), log(), fabs(), igam(), igamc(); #endif extern double MACHEP, MAXLOG; static double big = 4.503599627370496e15; static double biginv = 2.22044604925031308085e-16; double igamc( a, x ) double a, x; { double ans, ax, c, yc, r, t, y, z; double pk, pkm1, pkm2, qk, qkm1, qkm2; if( (x <= 0) || ( a <= 0) ) return( 1.0 ); if( (x < 1.0) || (x < a) ) return( 1.0 - igam(a,x) ); ax = a * log(x) - x - lgam(a); if( ax < -MAXLOG ) { mtherr( "igamc", UNDERFLOW ); return( 0.0 ); } ax = exp(ax); /* continued fraction */ y = 1.0 - a; z = x + y + 1.0; c = 0.0; pkm2 = 1.0; qkm2 = x; pkm1 = x + 1.0; qkm1 = z * x; ans = pkm1/qkm1; do { c += 1.0; y += 1.0; z += 2.0; yc = y * c; pk = pkm1 * z - pkm2 * yc; qk = qkm1 * z - qkm2 * yc; if( qk != 0 ) { r = pk/qk; t = fabs( (ans - r)/r ); ans = r; } else t = 1.0; pkm2 = pkm1; pkm1 = pk; qkm2 = qkm1; qkm1 = qk; if( fabs(pk) > big ) { pkm2 *= biginv; pkm1 *= biginv; qkm2 *= biginv; qkm1 *= biginv; } } while( t > MACHEP ); return( ans * ax ); } /* left tail of incomplete gamma function: * * inf. k * a -x - x * x e > ---------- * - - * k=0 | (a+k+1) * */ double igam( a, x ) double a, x; { double ans, ax, c, r; if( (x <= 0) || ( a <= 0) ) return( 0.0 ); if( (x > 1.0) && (x > a ) ) return( 1.0 - igamc(a,x) ); /* Compute x**a * exp(-x) / gamma(a) */ ax = a * log(x) - x - lgam(a); if( ax < -MAXLOG ) { mtherr( "igam", UNDERFLOW ); return( 0.0 ); } ax = exp(ax); /* power series */ r = a; c = 1.0; ans = 1.0; do { r += 1.0; c *= x/r; ans += c; } while( c/ans > MACHEP ); return( ans * ax/a ); }