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https://github.com/AuxXxilium/linux_dsm_epyc7002.git
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ece276de2a
MAC2008 means the processor implemented IEEE754 style Fused MADD instruction. It was introduced in Release3 but removed in Release5. The toolchain support of MAC2008 have never landed except for Loongson processors. This patch aimed to disabled the MAC2008 if it's optional. For MAC2008 only processors, we corrected math-emu behavior to align with actual hardware behavior. Signed-off-by: Jiaxun Yang <jiaxun.yang@flygoat.com> [paulburton@kernel.org: Fixup MIPSr2-r5 check in cpu_set_fpu_2008.] Signed-off-by: Paul Burton <paulburton@kernel.org> Cc: linux-mips@vger.kernel.org Cc: chenhc@lemote.com Cc: paul.burton@mips.com Cc: linux-kernel@vger.kernel.org
360 lines
7.8 KiB
C
360 lines
7.8 KiB
C
// SPDX-License-Identifier: GPL-2.0-only
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/*
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* IEEE754 floating point arithmetic
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* double precision: MADDF.f (Fused Multiply Add)
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* MADDF.fmt: FPR[fd] = FPR[fd] + (FPR[fs] x FPR[ft])
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*
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* MIPS floating point support
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* Copyright (C) 2015 Imagination Technologies, Ltd.
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* Author: Markos Chandras <markos.chandras@imgtec.com>
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*/
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#include "ieee754dp.h"
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/* 128 bits shift right logical with rounding. */
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static void srl128(u64 *hptr, u64 *lptr, int count)
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{
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u64 low;
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if (count >= 128) {
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*lptr = *hptr != 0 || *lptr != 0;
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*hptr = 0;
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} else if (count >= 64) {
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if (count == 64) {
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*lptr = *hptr | (*lptr != 0);
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} else {
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low = *lptr;
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*lptr = *hptr >> (count - 64);
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*lptr |= (*hptr << (128 - count)) != 0 || low != 0;
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}
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*hptr = 0;
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} else {
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low = *lptr;
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*lptr = low >> count | *hptr << (64 - count);
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*lptr |= (low << (64 - count)) != 0;
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*hptr = *hptr >> count;
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}
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}
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static union ieee754dp _dp_maddf(union ieee754dp z, union ieee754dp x,
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union ieee754dp y, enum maddf_flags flags)
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{
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int re;
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int rs;
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unsigned int lxm;
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unsigned int hxm;
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unsigned int lym;
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unsigned int hym;
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u64 lrm;
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u64 hrm;
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u64 lzm;
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u64 hzm;
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u64 t;
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u64 at;
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int s;
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COMPXDP;
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COMPYDP;
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COMPZDP;
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EXPLODEXDP;
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EXPLODEYDP;
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EXPLODEZDP;
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FLUSHXDP;
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FLUSHYDP;
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FLUSHZDP;
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ieee754_clearcx();
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rs = xs ^ ys;
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if (flags & MADDF_NEGATE_PRODUCT)
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rs ^= 1;
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if (flags & MADDF_NEGATE_ADDITION)
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zs ^= 1;
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/*
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* Handle the cases when at least one of x, y or z is a NaN.
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* Order of precedence is sNaN, qNaN and z, x, y.
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*/
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if (zc == IEEE754_CLASS_SNAN)
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return ieee754dp_nanxcpt(z);
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if (xc == IEEE754_CLASS_SNAN)
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return ieee754dp_nanxcpt(x);
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if (yc == IEEE754_CLASS_SNAN)
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return ieee754dp_nanxcpt(y);
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if (zc == IEEE754_CLASS_QNAN)
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return z;
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if (xc == IEEE754_CLASS_QNAN)
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return x;
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if (yc == IEEE754_CLASS_QNAN)
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return y;
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if (zc == IEEE754_CLASS_DNORM)
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DPDNORMZ;
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/* ZERO z cases are handled separately below */
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switch (CLPAIR(xc, yc)) {
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/*
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* Infinity handling
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*/
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case CLPAIR(IEEE754_CLASS_INF, IEEE754_CLASS_ZERO):
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case CLPAIR(IEEE754_CLASS_ZERO, IEEE754_CLASS_INF):
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ieee754_setcx(IEEE754_INVALID_OPERATION);
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return ieee754dp_indef();
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case CLPAIR(IEEE754_CLASS_NORM, IEEE754_CLASS_INF):
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case CLPAIR(IEEE754_CLASS_DNORM, IEEE754_CLASS_INF):
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case CLPAIR(IEEE754_CLASS_INF, IEEE754_CLASS_NORM):
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case CLPAIR(IEEE754_CLASS_INF, IEEE754_CLASS_DNORM):
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case CLPAIR(IEEE754_CLASS_INF, IEEE754_CLASS_INF):
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if ((zc == IEEE754_CLASS_INF) && (zs != rs)) {
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/*
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* Cases of addition of infinities with opposite signs
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* or subtraction of infinities with same signs.
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*/
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ieee754_setcx(IEEE754_INVALID_OPERATION);
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return ieee754dp_indef();
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}
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/*
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* z is here either not an infinity, or an infinity having the
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* same sign as product (x*y). The result must be an infinity,
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* and its sign is determined only by the sign of product (x*y).
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*/
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return ieee754dp_inf(rs);
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case CLPAIR(IEEE754_CLASS_ZERO, IEEE754_CLASS_ZERO):
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case CLPAIR(IEEE754_CLASS_ZERO, IEEE754_CLASS_NORM):
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case CLPAIR(IEEE754_CLASS_ZERO, IEEE754_CLASS_DNORM):
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case CLPAIR(IEEE754_CLASS_NORM, IEEE754_CLASS_ZERO):
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case CLPAIR(IEEE754_CLASS_DNORM, IEEE754_CLASS_ZERO):
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if (zc == IEEE754_CLASS_INF)
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return ieee754dp_inf(zs);
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if (zc == IEEE754_CLASS_ZERO) {
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/* Handle cases +0 + (-0) and similar ones. */
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if (zs == rs)
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/*
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* Cases of addition of zeros of equal signs
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* or subtraction of zeroes of opposite signs.
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* The sign of the resulting zero is in any
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* such case determined only by the sign of z.
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*/
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return z;
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return ieee754dp_zero(ieee754_csr.rm == FPU_CSR_RD);
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}
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/* x*y is here 0, and z is not 0, so just return z */
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return z;
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case CLPAIR(IEEE754_CLASS_DNORM, IEEE754_CLASS_DNORM):
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DPDNORMX;
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/* fall through */
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case CLPAIR(IEEE754_CLASS_NORM, IEEE754_CLASS_DNORM):
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if (zc == IEEE754_CLASS_INF)
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return ieee754dp_inf(zs);
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DPDNORMY;
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break;
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case CLPAIR(IEEE754_CLASS_DNORM, IEEE754_CLASS_NORM):
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if (zc == IEEE754_CLASS_INF)
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return ieee754dp_inf(zs);
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DPDNORMX;
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break;
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case CLPAIR(IEEE754_CLASS_NORM, IEEE754_CLASS_NORM):
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if (zc == IEEE754_CLASS_INF)
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return ieee754dp_inf(zs);
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/* continue to real computations */
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}
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/* Finally get to do some computation */
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/*
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* Do the multiplication bit first
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*
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* rm = xm * ym, re = xe + ye basically
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*
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* At this point xm and ym should have been normalized.
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*/
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assert(xm & DP_HIDDEN_BIT);
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assert(ym & DP_HIDDEN_BIT);
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re = xe + ye;
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/* shunt to top of word */
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xm <<= 64 - (DP_FBITS + 1);
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ym <<= 64 - (DP_FBITS + 1);
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/*
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* Multiply 64 bits xm and ym to give 128 bits result in hrm:lrm.
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*/
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lxm = xm;
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hxm = xm >> 32;
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lym = ym;
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hym = ym >> 32;
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lrm = DPXMULT(lxm, lym);
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hrm = DPXMULT(hxm, hym);
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t = DPXMULT(lxm, hym);
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at = lrm + (t << 32);
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hrm += at < lrm;
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lrm = at;
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hrm = hrm + (t >> 32);
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t = DPXMULT(hxm, lym);
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at = lrm + (t << 32);
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hrm += at < lrm;
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lrm = at;
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hrm = hrm + (t >> 32);
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/* Put explicit bit at bit 126 if necessary */
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if ((int64_t)hrm < 0) {
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lrm = (hrm << 63) | (lrm >> 1);
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hrm = hrm >> 1;
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re++;
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}
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assert(hrm & (1 << 62));
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if (zc == IEEE754_CLASS_ZERO) {
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/*
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* Move explicit bit from bit 126 to bit 55 since the
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* ieee754dp_format code expects the mantissa to be
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* 56 bits wide (53 + 3 rounding bits).
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*/
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srl128(&hrm, &lrm, (126 - 55));
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return ieee754dp_format(rs, re, lrm);
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}
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/* Move explicit bit from bit 52 to bit 126 */
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lzm = 0;
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hzm = zm << 10;
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assert(hzm & (1 << 62));
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/* Make the exponents the same */
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if (ze > re) {
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/*
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* Have to shift y fraction right to align.
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*/
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s = ze - re;
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srl128(&hrm, &lrm, s);
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re += s;
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} else if (re > ze) {
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/*
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* Have to shift x fraction right to align.
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*/
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s = re - ze;
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srl128(&hzm, &lzm, s);
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ze += s;
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}
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assert(ze == re);
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assert(ze <= DP_EMAX);
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/* Do the addition */
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if (zs == rs) {
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/*
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* Generate 128 bit result by adding two 127 bit numbers
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* leaving result in hzm:lzm, zs and ze.
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*/
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hzm = hzm + hrm + (lzm > (lzm + lrm));
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lzm = lzm + lrm;
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if ((int64_t)hzm < 0) { /* carry out */
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srl128(&hzm, &lzm, 1);
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ze++;
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}
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} else {
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if (hzm > hrm || (hzm == hrm && lzm >= lrm)) {
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hzm = hzm - hrm - (lzm < lrm);
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lzm = lzm - lrm;
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} else {
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hzm = hrm - hzm - (lrm < lzm);
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lzm = lrm - lzm;
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zs = rs;
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}
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if (lzm == 0 && hzm == 0)
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return ieee754dp_zero(ieee754_csr.rm == FPU_CSR_RD);
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/*
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* Put explicit bit at bit 126 if necessary.
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*/
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if (hzm == 0) {
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/* left shift by 63 or 64 bits */
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if ((int64_t)lzm < 0) {
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/* MSB of lzm is the explicit bit */
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hzm = lzm >> 1;
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lzm = lzm << 63;
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ze -= 63;
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} else {
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hzm = lzm;
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lzm = 0;
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ze -= 64;
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}
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}
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t = 0;
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while ((hzm >> (62 - t)) == 0)
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t++;
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assert(t <= 62);
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if (t) {
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hzm = hzm << t | lzm >> (64 - t);
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lzm = lzm << t;
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ze -= t;
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}
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}
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/*
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* Move explicit bit from bit 126 to bit 55 since the
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* ieee754dp_format code expects the mantissa to be
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* 56 bits wide (53 + 3 rounding bits).
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*/
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srl128(&hzm, &lzm, (126 - 55));
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return ieee754dp_format(zs, ze, lzm);
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}
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union ieee754dp ieee754dp_maddf(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, 0);
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}
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union ieee754dp ieee754dp_msubf(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, MADDF_NEGATE_PRODUCT);
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}
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union ieee754dp ieee754dp_madd(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, 0);
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}
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union ieee754dp ieee754dp_msub(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, MADDF_NEGATE_ADDITION);
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}
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union ieee754dp ieee754dp_nmadd(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, MADDF_NEGATE_PRODUCT|MADDF_NEGATE_ADDITION);
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}
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union ieee754dp ieee754dp_nmsub(union ieee754dp z, union ieee754dp x,
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union ieee754dp y)
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{
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return _dp_maddf(z, x, y, MADDF_NEGATE_PRODUCT);
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}
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