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/* ix87 specific implementation of pow function.
   Copyright (C) 1996-2013 Free Software Foundation, Inc.
   This file is part of the GNU C Library.
   Contributed by Ulrich Drepper <drepper@cygnus.com>, 1996.

   The GNU C Library is free software; you can redistribute it and/or
   modify it under the terms of the GNU Lesser General Public
   License as published by the Free Software Foundation; either
   version 2.1 of the License, or (at your option) any later version.

   The GNU C Library 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
   Lesser General Public License for more details.

   You should have received a copy of the GNU Lesser General Public
   License along with the GNU C Library; if not, see
   <http://www.gnu.org/licenses/>.  */

#include <machine/asm.h>

	.section .rodata.cst8,"aM",@progbits,8

	.p2align 3
	.type one,@object
one:	.double 1.0
	ASM_SIZE_DIRECTIVE(one)
	.type p3,@object
p3:	.byte 0, 0, 0, 0, 0, 0, 0x20, 0x40
	ASM_SIZE_DIRECTIVE(p3)
	.type p63,@object
p63:	.byte 0, 0, 0, 0, 0, 0, 0xe0, 0x43
	ASM_SIZE_DIRECTIVE(p63)
	.type p64,@object
p64:	.byte 0, 0, 0, 0, 0, 0, 0xf0, 0x43
	ASM_SIZE_DIRECTIVE(p64)
	.type p78,@object
p78:	.byte 0, 0, 0, 0, 0, 0, 0xd0, 0x44
	ASM_SIZE_DIRECTIVE(p78)
	.type pm79,@object
pm79:	.byte 0, 0, 0, 0, 0, 0, 0, 0x3b
	ASM_SIZE_DIRECTIVE(pm79)

	.section .rodata.cst16,"aM",@progbits,16

	.p2align 3
	.type infinity,@object
inf_zero:
infinity:
	.byte 0, 0, 0, 0, 0, 0, 0xf0, 0x7f
	ASM_SIZE_DIRECTIVE(infinity)
	.type zero,@object
zero:	.double 0.0
	ASM_SIZE_DIRECTIVE(zero)
	.type minf_mzero,@object
minf_mzero:
minfinity:
	.byte 0, 0, 0, 0, 0, 0, 0xf0, 0xff
mzero:
	.byte 0, 0, 0, 0, 0, 0, 0, 0x80
	ASM_SIZE_DIRECTIVE(minf_mzero)

#ifdef PIC
# define MO(op) op##(%rip)
#else
# define MO(op) op
#endif

	.text
ENTRY(__ieee754_powl)
	fldt	24(%rsp)	// y
	fxam


	fnstsw
	movb	%ah, %dl
	andb	$0x45, %ah
	cmpb	$0x40, %ah	// is y == 0 ?
	je	11f

	cmpb	$0x05, %ah	// is y == ±inf ?
	je	12f

	cmpb	$0x01, %ah	// is y == NaN ?
	je	30f

	fldt	8(%rsp)		// x : y

	fxam
	fnstsw
	movb	%ah, %dh
	andb	$0x45, %ah
	cmpb	$0x40, %ah
	je	20f		// x is ±0

	cmpb	$0x05, %ah
	je	15f		// x is ±inf

	cmpb	$0x01, %ah
	je	31f		// x is NaN

	fxch			// y : x

	/* fistpll raises invalid exception for |y| >= 1L<<63.  */
	fldl	MO(p63)		// 1L<<63 : y : x
	fld	%st(1)		// y : 1L<<63 : y : x
	fabs			// |y| : 1L<<63 : y : x
	fcomip	%st(1), %st	// 1L<<63 : y : x
	fstp	%st(0)		// y : x
	jnc	2f

	/* First see whether `y' is a natural number.  In this case we
	   can use a more precise algorithm.  */
	fld	%st		// y : y : x
	fistpll	-8(%rsp)	// y : x
	fildll	-8(%rsp)	// int(y) : y : x
	fucomip	%st(1),%st	// y : x
	je	9f

	// If y has absolute value at most 0x1p-79, then any finite
	// nonzero x will result in 1.  Saturate y to those bounds to
	// avoid underflow in the calculation of y*log2(x).
	fldl	MO(pm79)	// 0x1p-79 : y : x
	fld	%st(1)		// y : 0x1p-79 : y : x
	fabs			// |y| : 0x1p-79 : y : x
	fcomip	%st(1), %st	// 0x1p-79 : y : x
	fstp	%st(0)		// y : x
	jnc	3f
	fstp	%st(0)		// pop y
	fldl	MO(pm79)	// 0x1p-79 : x
	testb	$2, %dl
	jnz	3f		// y > 0
	fchs			// -0x1p-79 : x
	jmp	3f

9:	/* OK, we have an integer value for y.  Unless very small
	   (we use < 8), use the algorithm for real exponent to avoid
	   accumulation of errors.  */
	fldl	MO(p3)		// 8 : y : x
	fld	%st(1)		// y : 8 : y : x
	fabs			// |y| : 8 : y : x
	fcomip	%st(1), %st	// 8 : y : x
	fstp	%st(0)		// y : x
	jnc	2f
	mov	-8(%rsp),%eax
	mov	-4(%rsp),%edx
	orl	$0, %edx
	fstp	%st(0)		// x
	jns	4f		// y >= 0, jump
	fdivrl	MO(one)		// 1/x		(now referred to as x)
	negl	%eax
	adcl	$0, %edx
	negl	%edx
4:	fldl	MO(one)		// 1 : x
	fxch

6:	shrdl	$1, %edx, %eax
	jnc	5f
	fxch
	fmul	%st(1)		// x : ST*x
	fxch
5:	fmul	%st(0), %st	// x*x : ST*x
	shrl	$1, %edx
	movl	%eax, %ecx
	orl	%edx, %ecx
	jnz	6b
	fstp	%st(0)		// ST*x
	ret

	/* y is ±NAN */
30:	fldt	8(%rsp)		// x : y
	fldl	MO(one)		// 1.0 : x : y
	fucomip	%st(1),%st	// x : y
	je	31f
	fxch			// y : x
31:	fstp	%st(1)
	ret

	.align ALIGNARG(4)
2:	// y is a large integer (absolute value at least 8), but
	// may be odd unless at least 1L<<64.  So it may be necessary
	// to adjust the sign of a negative result afterwards.
	fxch			// x : y
	fabs			// |x| : y
	fxch			// y : |x|
	// If y has absolute value at least 1L<<78, then any finite
	// nonzero x will result in 0 (underflow), 1 or infinity (overflow).
	// Saturate y to those bounds to avoid overflow in the calculation
	// of y*log2(x).
	fldl	MO(p78)		// 1L<<78 : y : |x|
	fld	%st(1)		// y : 1L<<78 : y : |x|
	fabs			// |y| : 1L<<78 : y : |x|
	fcomip	%st(1), %st	// 1L<<78 : y : |x|
	fstp	%st(0)		// y : |x|
	jc	3f
	fstp	%st(0)		// pop y
	fldl	MO(p78)		// 1L<<78 : |x|
	testb	$2, %dl
	jz	3f		// y > 0
	fchs			// -(1L<<78) : |x|
	.align ALIGNARG(4)
3:	/* y is a real number.  */
	subq	$40, %rsp
	cfi_adjust_cfa_offset (40)
	fstpt	16(%rsp)	// x
	fstpt	(%rsp)		// <empty>
	mov	%edx, 32(%rsp)
	call	HIDDEN_JUMPTARGET (__powl_helper)	// <result>
	mov	32(%rsp), %edx
	addq	$40, %rsp
	cfi_adjust_cfa_offset (-40)
	testb	$2, %dh
	jz	292f
	// x is negative.  If y is an odd integer, negate the result.
	fldt	24(%rsp)	// y : abs(result)
	fldl	MO(p64)		// 1L<<64 : y : abs(result)
	fld	%st(1)		// y : 1L<<64 : y : abs(result)
	fabs			// |y| : 1L<<64 : y : abs(result)
	fcomip	%st(1), %st	// 1L<<64 : y : abs(result)
	fstp	%st(0)		// y : abs(result)
	jnc	291f
	fldl	MO(p63)		// p63 : y : abs(result)
	fxch			// y : p63 : abs(result)
	fprem			// y%p63 : p63 : abs(result)
	fstp	%st(1)		// y%p63 : abs(result)

	// We must find out whether y is an odd integer.
	fld	%st		// y : y : abs(result)
	fistpll	-8(%rsp)	// y : abs(result)
	fildll	-8(%rsp)	// int(y) : y : abs(result)
	fucomip	%st(1),%st	// y : abs(result)
	ffreep	%st		// abs(result)
	jne	292f

	// OK, the value is an integer, but is it odd?
	mov	-8(%rsp), %eax
	mov	-4(%rsp), %edx
	andb	$1, %al
	jz	290f		// jump if not odd
	// It's an odd integer.
	fchs
290:	ret
291:	fstp	%st(0)		// abs(result)
292:	ret

	// pow(x,±0) = 1
	.align ALIGNARG(4)
11:	fstp	%st(0)		// pop y
	fldl	MO(one)
	ret

	// y == ±inf
	.align ALIGNARG(4)
12:	fstp	%st(0)		// pop y
	fldl	MO(one)		// 1
	fldt	8(%rsp)		// x : 1
	fabs			// abs(x) : 1
	fucompp			// < 1, == 1, or > 1
	fnstsw
	andb	$0x45, %ah
	cmpb	$0x45, %ah
	je	13f		// jump if x is NaN

	cmpb	$0x40, %ah
	je	14f		// jump if |x| == 1

	shlb	$1, %ah
	xorb	%ah, %dl
	andl	$2, %edx
#ifdef PIC
	lea	inf_zero(%rip),%rcx
	fldl	(%rcx, %rdx, 4)
#else
	fldl	inf_zero(,%rdx, 4)
#endif
	ret

	.align ALIGNARG(4)
14:	fldl	MO(one)
	ret

	.align ALIGNARG(4)
13:	fldt	8(%rsp)		// load x == NaN
	ret

	.align ALIGNARG(4)
	// x is ±inf
15:	fstp	%st(0)		// y
	testb	$2, %dh
	jz	16f		// jump if x == +inf

	// fistpll raises invalid exception for |y| >= 1L<<63, but y
	// may be odd unless we know |y| >= 1L<<64.
	fldl	MO(p64)		// 1L<<64 : y
	fld	%st(1)		// y : 1L<<64 : y
	fabs			// |y| : 1L<<64 : y
	fcomip	%st(1), %st	// 1L<<64 : y
	fstp	%st(0)		// y
	jnc	16f
	fldl	MO(p63)		// p63 : y
	fxch			// y : p63
	fprem			// y%p63 : p63
	fstp	%st(1)		// y%p63

	// We must find out whether y is an odd integer.
	fld	%st		// y : y
	fistpll	-8(%rsp)	// y
	fildll	-8(%rsp)	// int(y) : y
	fucomip %st(1),%st
	ffreep	%st		// <empty>
	jne	17f

	// OK, the value is an integer, but is it odd?
	mov	-8(%rsp), %eax
	mov	-4(%rsp), %edx
	andb	$1, %al
	jz	18f		// jump if not odd
	// It's an odd integer.
	shrl	$31, %edx
#ifdef PIC
	lea	minf_mzero(%rip),%rcx
	fldl	(%rcx, %rdx, 8)
#else
	fldl	minf_mzero(,%rdx, 8)
#endif
	ret

	.align ALIGNARG(4)
16:	fcompl	MO(zero)
	fnstsw
	shrl	$5, %eax
	andl	$8, %eax
#ifdef PIC
	lea	inf_zero(%rip),%rcx
	fldl	(%rcx, %rax, 1)
#else
	fldl	inf_zero(,%rax, 1)
#endif
	ret

	.align ALIGNARG(4)
17:	shll	$30, %edx	// sign bit for y in right position
18:	shrl	$31, %edx
#ifdef PIC
	lea	inf_zero(%rip),%rcx
	fldl	(%rcx, %rdx, 8)
#else
	fldl	inf_zero(,%rdx, 8)
#endif
	ret

	.align ALIGNARG(4)
	// x is ±0
20:	fstp	%st(0)		// y
	testb	$2, %dl
	jz	21f		// y > 0

	// x is ±0 and y is < 0.  We must find out whether y is an odd integer.
	testb	$2, %dh
	jz	25f

	// fistpll raises invalid exception for |y| >= 1L<<63, but y
	// may be odd unless we know |y| >= 1L<<64.
	fldl	MO(p64)		// 1L<<64 : y
	fld	%st(1)		// y : 1L<<64 : y
	fabs			// |y| : 1L<<64 : y
	fcomip	%st(1), %st	// 1L<<64 : y
	fstp	%st(0)		// y
	jnc	25f
	fldl	MO(p63)		// p63 : y
	fxch			// y : p63
	fprem			// y%p63 : p63
	fstp	%st(1)		// y%p63

	fld	%st		// y : y
	fistpll	-8(%rsp)	// y
	fildll	-8(%rsp)	// int(y) : y
	fucomip	%st(1),%st
	ffreep	%st		// <empty>
	jne	26f

	// OK, the value is an integer, but is it odd?
	mov	-8(%rsp),%eax
	mov	-4(%rsp),%edx
	andb	$1, %al
	jz	27f		// jump if not odd
	// It's an odd integer.
	// Raise divide-by-zero exception and get minus infinity value.
	fldl	MO(one)
	fdivl	MO(zero)
	fchs
	ret

25:	fstp	%st(0)
26:
27:	// Raise divide-by-zero exception and get infinity value.
	fldl	MO(one)
	fdivl	MO(zero)
	ret

	.align ALIGNARG(4)
	// x is ±0 and y is > 0.  We must find out whether y is an odd integer.
21:	testb	$2, %dh
	jz	22f

	// fistpll raises invalid exception for |y| >= 1L<<63, but y
	// may be odd unless we know |y| >= 1L<<64.
	fldl	MO(p64)		// 1L<<64 : y
	fxch			// y : 1L<<64
	fcomi	%st(1), %st	// y : 1L<<64
	fstp	%st(1)		// y
	jnc	22f
	fldl	MO(p63)		// p63 : y
	fxch			// y : p63
	fprem			// y%p63 : p63
	fstp	%st(1)		// y%p63

	fld	%st		// y : y
	fistpll	-8(%rsp)	// y
	fildll	-8(%rsp)	// int(y) : y
	fucomip %st(1),%st
	ffreep	%st		// <empty>
	jne	23f

	// OK, the value is an integer, but is it odd?
	mov	-8(%rsp),%eax
	mov	-4(%rsp),%edx
	andb	$1, %al
	jz	24f		// jump if not odd
	// It's an odd integer.
	fldl	MO(mzero)
	ret

22:	fstp	%st(0)
23:
24:	fldl	MO(zero)
	ret

END(__ieee754_powl)
strong_alias (__ieee754_powl, __powl_finite)