/* Implementation of the ERFC_SCALED intrinsic. Copyright (C) 2008-2022 Free Software Foundation, Inc. This file is part of the GNU Fortran runtime library (libgfortran). Libgfortran is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 3 of the License, or (at your option) any later version. Libgfortran is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. Under Section 7 of GPL version 3, you are granted additional permissions described in the GCC Runtime Library Exception, version 3.1, as published by the Free Software Foundation. You should have received a copy of the GNU General Public License and a copy of the GCC Runtime Library Exception along with this program; see the files COPYING3 and COPYING.RUNTIME respectively. If not, see . */ #include "libgfortran.h" /* This implementation of ERFC_SCALED is based on the netlib algorithm available at http://www.netlib.org/specfun/erf */ #ifdef HAVE_GFC_REAL_4 #undef KIND #define KIND 4 #include "erfc_scaled_inc.c" #endif #ifdef HAVE_GFC_REAL_8 #undef KIND #define KIND 8 #include "erfc_scaled_inc.c" #endif #ifdef HAVE_GFC_REAL_10 #undef KIND #define KIND 10 #include "erfc_scaled_inc.c" #endif #ifdef HAVE_GFC_REAL_16 /* For quadruple-precision, netlib's implementation is not accurate enough. We provide another one. */ #ifdef GFC_REAL_16_IS_FLOAT128 # define _THRESH -106.566990228185312813205074546585730Q # define _M_2_SQRTPI M_2_SQRTPIq # define _INF __builtin_infq() # define _ERFC(x) erfcq(x) # define _EXP(x) expq(x) #else # define _THRESH -106.566990228185312813205074546585730L # ifndef M_2_SQRTPIl # define M_2_SQRTPIl 1.128379167095512573896158903121545172L # endif # define _M_2_SQRTPI M_2_SQRTPIl # define _INF __builtin_infl() # ifdef HAVE_ERFCL # define _ERFC(x) erfcl(x) # endif # ifdef HAVE_EXPL # define _EXP(x) expl(x) # endif #endif #define ERFC_SCALED(k) \ GFC_REAL_ ## k \ erfc_scaled_r ## k (GFC_REAL_ ## k x) \ { \ if (x < _THRESH) \ { \ return _INF; \ } \ if (x < 12) \ { \ /* Compute directly as ERFC_SCALED(x) = ERFC(x) * EXP(X**2). \ This is not perfect, but much better than netlib. */ \ return _ERFC(x) * _EXP(x * x); \ } \ else \ { \ /* Calculate ERFC_SCALED(x) using a power series in 1/x: \ ERFC_SCALED(x) = 1 / (x * sqrt(pi)) \ * (1 + Sum_n (-1)**n * (1 * 3 * 5 * ... * (2n-1)) \ / (2 * x**2)**n) \ */ \ GFC_REAL_ ## k sum = 0, oldsum; \ GFC_REAL_ ## k inv2x2 = 1 / (2 * x * x); \ GFC_REAL_ ## k fac = 1; \ int n = 1; \ \ while (n < 200) \ { \ fac *= - (2*n - 1) * inv2x2; \ oldsum = sum; \ sum += fac; \ \ if (sum == oldsum) \ break; \ \ n++; \ } \ \ return (1 + sum) / x * (_M_2_SQRTPI / 2); \ } \ } #if defined(_ERFC) && defined(_EXP) extern GFC_REAL_16 erfc_scaled_r16 (GFC_REAL_16); export_proto(erfc_scaled_r16); ERFC_SCALED(16) #endif #undef _THRESH #undef _M_2_SQRTPI #undef _INF #undef _ERFC #undef _EXP #endif #ifdef HAVE_GFC_REAL_17 /* For quadruple-precision, netlib's implementation is not accurate enough. We provide another one. */ # define _THRESH -106.566990228185312813205074546585730Q # define _M_2_SQRTPI M_2_SQRTPIq # define _INF __builtin_inff128() # ifdef POWER_IEEE128 # define _ERFC(x) __erfcieee128(x) # define _EXP(x) __expieee128(x) # else # define _ERFC(x) erfcq(x) # define _EXP(x) expq(x) # endif extern GFC_REAL_17 erfc_scaled_r17 (GFC_REAL_17); export_proto(erfc_scaled_r17); ERFC_SCALED(17) #undef _THRESH #undef _M_2_SQRTPI #undef _INF #undef _ERFC #undef _EXP #undef ERFC_SCALED #endif