libgcc/config/rs6000/_divkc3.c - gcc - Git at Google

 /* Copyright (C) 1989-2021 Free Software Foundation, Inc.

 This file is part of GCC.

 GCC 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, or (at your option) any later
 version.

 GCC 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
 <http://www.gnu.org/licenses/>.  */

 /* This is a temporary specialization of code from libgcc/libgcc2.c.  */

 #include "soft-fp.h"
 #include "quad-float128.h"

 #define COPYSIGN(x,y) __builtin_copysignf128 (x, y)
 #define INFINITY __builtin_inff128 ()
 #define FABS __builtin_fabsf128
 #define isnan __builtin_isnan
 #define isinf __builtin_isinf
 #define isfinite __builtin_isfinite

 #if defined(FLOAT128_HW_INSNS) && !defined(__divkc3)
 #define __divkc3 __divkc3_sw
 #endif

 TCtype
 __divkc3 (TFtype a, TFtype b, TFtype c, TFtype d)
 {
   TFtype denom, ratio, x, y;
   TCtype res;

   /* ??? We can get better behavior from logarithmic scaling instead of
      the division.  But that would mean starting to link libgcc against
      libm.  We could implement something akin to ldexp/frexp as gcc builtins
      fairly easily...  */
   if (FABS (c) < FABS (d))
     {
       ratio = c / d;
       denom = (c * ratio) + d;
       x = ((a * ratio) + b) / denom;
       y = ((b * ratio) - a) / denom;
     }
   else
     {
       ratio = d / c;
       denom = (d * ratio) + c;
       x = ((b * ratio) + a) / denom;
       y = (b - (a * ratio)) / denom;
     }

   /* Recover infinities and zeros that computed as NaN+iNaN; the only cases
      are nonzero/zero, infinite/finite, and finite/infinite.  */
   if (isnan (x) && isnan (y))
     {
       if (c == 0.0 && d == 0.0 && (!isnan (a) || !isnan (b)))
 	{
 	  x = COPYSIGN (INFINITY, c) * a;
 	  y = COPYSIGN (INFINITY, c) * b;
 	}
       else if ((isinf (a) || isinf (b)) && isfinite (c) && isfinite (d))
 	{
 	  a = COPYSIGN (isinf (a) ? 1 : 0, a);
 	  b = COPYSIGN (isinf (b) ? 1 : 0, b);
 	  x = INFINITY * (a * c + b * d);
 	  y = INFINITY * (b * c - a * d);
 	}
       else if ((isinf (c) || isinf (d)) && isfinite (a) && isfinite (b))
 	{
 	  c = COPYSIGN (isinf (c) ? 1 : 0, c);
 	  d = COPYSIGN (isinf (d) ? 1 : 0, d);
 	  x = 0.0 * (a * c + b * d);
 	  y = 0.0 * (b * c - a * d);
 	}
     }

   __real__ res = x;
   __imag__ res = y;
   return res;
 }
	/* Copyright (C) 1989-2021 Free Software Foundation, Inc.

	This file is part of GCC.

	GCC 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, or (at your option) any later
	version.

	GCC 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
	<http://www.gnu.org/licenses/>. */

	/* This is a temporary specialization of code from libgcc/libgcc2.c. */

	#include "soft-fp.h"
	#include "quad-float128.h"

	#define COPYSIGN(x,y) __builtin_copysignf128 (x, y)
	#define INFINITY __builtin_inff128 ()
	#define FABS __builtin_fabsf128
	#define isnan __builtin_isnan
	#define isinf __builtin_isinf
	#define isfinite __builtin_isfinite

	#if defined(FLOAT128_HW_INSNS) && !defined(__divkc3)
	#define __divkc3 __divkc3_sw
	#endif

	TCtype
	__divkc3 (TFtype a, TFtype b, TFtype c, TFtype d)
	{
	TFtype denom, ratio, x, y;
	TCtype res;

	/* ??? We can get better behavior from logarithmic scaling instead of
	the division. But that would mean starting to link libgcc against
	libm. We could implement something akin to ldexp/frexp as gcc builtins
	fairly easily... */
	if (FABS (c) < FABS (d))
	{
	ratio = c / d;
	denom = (c * ratio) + d;
	x = ((a * ratio) + b) / denom;
	y = ((b * ratio) - a) / denom;
	}
	else
	{
	ratio = d / c;
	denom = (d * ratio) + c;
	x = ((b * ratio) + a) / denom;
	y = (b - (a * ratio)) / denom;
	}

	/* Recover infinities and zeros that computed as NaN+iNaN; the only cases
	are nonzero/zero, infinite/finite, and finite/infinite. */
	if (isnan (x) && isnan (y))
	{
	if (c == 0.0 && d == 0.0 && (!isnan (a) \|\| !isnan (b)))
	{
	x = COPYSIGN (INFINITY, c) * a;
	y = COPYSIGN (INFINITY, c) * b;
	}
	else if ((isinf (a) \|\| isinf (b)) && isfinite (c) && isfinite (d))
	{
	a = COPYSIGN (isinf (a) ? 1 : 0, a);
	b = COPYSIGN (isinf (b) ? 1 : 0, b);
	x = INFINITY * (a * c + b * d);
	y = INFINITY * (b * c - a * d);
	}
	else if ((isinf (c) \|\| isinf (d)) && isfinite (a) && isfinite (b))
	{
	c = COPYSIGN (isinf (c) ? 1 : 0, c);
	d = COPYSIGN (isinf (d) ? 1 : 0, d);
	x = 0.0 * (a * c + b * d);
	y = 0.0 * (b * c - a * d);
	}
	}

	__real__ res = x;
	__imag__ res = y;
	return res;
	}