llvm-6502/lib/Support/APFloat.cpp
Dale Johannesen d0763b9159 Fix denormal check in float->APInt conversion.
PR 1804.


git-svn-id: https://llvm.org/svn/llvm-project/llvm/trunk@44201 91177308-0d34-0410-b5e6-96231b3b80d8
2007-11-17 01:02:27 +00:00

2800 lines
78 KiB
C++

//===-- APFloat.cpp - Implement APFloat class -----------------------------===//
//
// The LLVM Compiler Infrastructure
//
// This file was developed by Neil Booth and is distributed under the
// University of Illinois Open Source License. See LICENSE.TXT for details.
//
//===----------------------------------------------------------------------===//
//
// This file implements a class to represent arbitrary precision floating
// point values and provide a variety of arithmetic operations on them.
//
//===----------------------------------------------------------------------===//
#include <cassert>
#include <cstring>
#include "llvm/ADT/APFloat.h"
#include "llvm/Support/MathExtras.h"
using namespace llvm;
#define convolve(lhs, rhs) ((lhs) * 4 + (rhs))
/* Assumed in hexadecimal significand parsing, and conversion to
hexadecimal strings. */
COMPILE_TIME_ASSERT(integerPartWidth % 4 == 0);
namespace llvm {
/* Represents floating point arithmetic semantics. */
struct fltSemantics {
/* The largest E such that 2^E is representable; this matches the
definition of IEEE 754. */
exponent_t maxExponent;
/* The smallest E such that 2^E is a normalized number; this
matches the definition of IEEE 754. */
exponent_t minExponent;
/* Number of bits in the significand. This includes the integer
bit. */
unsigned int precision;
/* True if arithmetic is supported. */
unsigned int arithmeticOK;
};
const fltSemantics APFloat::IEEEsingle = { 127, -126, 24, true };
const fltSemantics APFloat::IEEEdouble = { 1023, -1022, 53, true };
const fltSemantics APFloat::IEEEquad = { 16383, -16382, 113, true };
const fltSemantics APFloat::x87DoubleExtended = { 16383, -16382, 64, true };
const fltSemantics APFloat::Bogus = { 0, 0, 0, true };
// The PowerPC format consists of two doubles. It does not map cleanly
// onto the usual format above. For now only storage of constants of
// this type is supported, no arithmetic.
const fltSemantics APFloat::PPCDoubleDouble = { 1023, -1022, 106, false };
/* A tight upper bound on number of parts required to hold the value
pow(5, power) is
power * 815 / (351 * integerPartWidth) + 1
However, whilst the result may require only this many parts,
because we are multiplying two values to get it, the
multiplication may require an extra part with the excess part
being zero (consider the trivial case of 1 * 1, tcFullMultiply
requires two parts to hold the single-part result). So we add an
extra one to guarantee enough space whilst multiplying. */
const unsigned int maxExponent = 16383;
const unsigned int maxPrecision = 113;
const unsigned int maxPowerOfFiveExponent = maxExponent + maxPrecision - 1;
const unsigned int maxPowerOfFiveParts = 2 + ((maxPowerOfFiveExponent * 815)
/ (351 * integerPartWidth));
}
/* Put a bunch of private, handy routines in an anonymous namespace. */
namespace {
inline unsigned int
partCountForBits(unsigned int bits)
{
return ((bits) + integerPartWidth - 1) / integerPartWidth;
}
/* Returns 0U-9U. Return values >= 10U are not digits. */
inline unsigned int
decDigitValue(unsigned int c)
{
return c - '0';
}
unsigned int
hexDigitValue(unsigned int c)
{
unsigned int r;
r = c - '0';
if(r <= 9)
return r;
r = c - 'A';
if(r <= 5)
return r + 10;
r = c - 'a';
if(r <= 5)
return r + 10;
return -1U;
}
inline void
assertArithmeticOK(const llvm::fltSemantics &semantics) {
assert(semantics.arithmeticOK
&& "Compile-time arithmetic does not support these semantics");
}
/* Return the value of a decimal exponent of the form
[+-]ddddddd.
If the exponent overflows, returns a large exponent with the
appropriate sign. */
int
readExponent(const char *p)
{
bool isNegative;
unsigned int absExponent;
const unsigned int overlargeExponent = 24000; /* FIXME. */
isNegative = (*p == '-');
if (*p == '-' || *p == '+')
p++;
absExponent = decDigitValue(*p++);
assert (absExponent < 10U);
for (;;) {
unsigned int value;
value = decDigitValue(*p);
if (value >= 10U)
break;
p++;
value += absExponent * 10;
if (absExponent >= overlargeExponent) {
absExponent = overlargeExponent;
break;
}
absExponent = value;
}
if (isNegative)
return -(int) absExponent;
else
return (int) absExponent;
}
/* This is ugly and needs cleaning up, but I don't immediately see
how whilst remaining safe. */
int
totalExponent(const char *p, int exponentAdjustment)
{
integerPart unsignedExponent;
bool negative, overflow;
long exponent;
/* Move past the exponent letter and sign to the digits. */
p++;
negative = *p == '-';
if(*p == '-' || *p == '+')
p++;
unsignedExponent = 0;
overflow = false;
for(;;) {
unsigned int value;
value = decDigitValue(*p);
if(value >= 10U)
break;
p++;
unsignedExponent = unsignedExponent * 10 + value;
if(unsignedExponent > 65535)
overflow = true;
}
if(exponentAdjustment > 65535 || exponentAdjustment < -65536)
overflow = true;
if(!overflow) {
exponent = unsignedExponent;
if(negative)
exponent = -exponent;
exponent += exponentAdjustment;
if(exponent > 65535 || exponent < -65536)
overflow = true;
}
if(overflow)
exponent = negative ? -65536: 65535;
return exponent;
}
const char *
skipLeadingZeroesAndAnyDot(const char *p, const char **dot)
{
*dot = 0;
while(*p == '0')
p++;
if(*p == '.') {
*dot = p++;
while(*p == '0')
p++;
}
return p;
}
/* Given a normal decimal floating point number of the form
dddd.dddd[eE][+-]ddd
where the decimal point and exponent are optional, fill out the
structure D. Exponent is appropriate if the significand is
treated as an integer, and normalizedExponent if the significand
is taken to have the decimal point after a single leading
non-zero digit.
If the value is zero, V->firstSigDigit points to a zero, and the
return exponent is zero.
*/
struct decimalInfo {
const char *firstSigDigit;
const char *lastSigDigit;
int exponent;
int normalizedExponent;
};
void
interpretDecimal(const char *p, decimalInfo *D)
{
const char *dot;
p = skipLeadingZeroesAndAnyDot (p, &dot);
D->firstSigDigit = p;
D->exponent = 0;
D->normalizedExponent = 0;
for (;;) {
if (*p == '.') {
assert(dot == 0);
dot = p++;
}
if (decDigitValue(*p) >= 10U)
break;
p++;
}
/* If number is all zerooes accept any exponent. */
if (p != D->firstSigDigit) {
if (*p == 'e' || *p == 'E')
D->exponent = readExponent(p + 1);
/* Implied decimal point? */
if (!dot)
dot = p;
/* Drop insignificant trailing zeroes. */
do
do
p--;
while (*p == '0');
while (*p == '.');
/* Adjust the exponents for any decimal point. */
D->exponent += (dot - p) - (dot > p);
D->normalizedExponent = (D->exponent + (p - D->firstSigDigit)
- (dot > D->firstSigDigit && dot < p));
}
D->lastSigDigit = p;
}
/* Return the trailing fraction of a hexadecimal number.
DIGITVALUE is the first hex digit of the fraction, P points to
the next digit. */
lostFraction
trailingHexadecimalFraction(const char *p, unsigned int digitValue)
{
unsigned int hexDigit;
/* If the first trailing digit isn't 0 or 8 we can work out the
fraction immediately. */
if(digitValue > 8)
return lfMoreThanHalf;
else if(digitValue < 8 && digitValue > 0)
return lfLessThanHalf;
/* Otherwise we need to find the first non-zero digit. */
while(*p == '0')
p++;
hexDigit = hexDigitValue(*p);
/* If we ran off the end it is exactly zero or one-half, otherwise
a little more. */
if(hexDigit == -1U)
return digitValue == 0 ? lfExactlyZero: lfExactlyHalf;
else
return digitValue == 0 ? lfLessThanHalf: lfMoreThanHalf;
}
/* Return the fraction lost were a bignum truncated losing the least
significant BITS bits. */
lostFraction
lostFractionThroughTruncation(const integerPart *parts,
unsigned int partCount,
unsigned int bits)
{
unsigned int lsb;
lsb = APInt::tcLSB(parts, partCount);
/* Note this is guaranteed true if bits == 0, or LSB == -1U. */
if(bits <= lsb)
return lfExactlyZero;
if(bits == lsb + 1)
return lfExactlyHalf;
if(bits <= partCount * integerPartWidth
&& APInt::tcExtractBit(parts, bits - 1))
return lfMoreThanHalf;
return lfLessThanHalf;
}
/* Shift DST right BITS bits noting lost fraction. */
lostFraction
shiftRight(integerPart *dst, unsigned int parts, unsigned int bits)
{
lostFraction lost_fraction;
lost_fraction = lostFractionThroughTruncation(dst, parts, bits);
APInt::tcShiftRight(dst, parts, bits);
return lost_fraction;
}
/* Combine the effect of two lost fractions. */
lostFraction
combineLostFractions(lostFraction moreSignificant,
lostFraction lessSignificant)
{
if(lessSignificant != lfExactlyZero) {
if(moreSignificant == lfExactlyZero)
moreSignificant = lfLessThanHalf;
else if(moreSignificant == lfExactlyHalf)
moreSignificant = lfMoreThanHalf;
}
return moreSignificant;
}
/* The error from the true value, in half-ulps, on multiplying two
floating point numbers, which differ from the value they
approximate by at most HUE1 and HUE2 half-ulps, is strictly less
than the returned value.
See "How to Read Floating Point Numbers Accurately" by William D
Clinger. */
unsigned int
HUerrBound(bool inexactMultiply, unsigned int HUerr1, unsigned int HUerr2)
{
assert(HUerr1 < 2 || HUerr2 < 2 || (HUerr1 + HUerr2 < 8));
if (HUerr1 + HUerr2 == 0)
return inexactMultiply * 2; /* <= inexactMultiply half-ulps. */
else
return inexactMultiply + 2 * (HUerr1 + HUerr2);
}
/* The number of ulps from the boundary (zero, or half if ISNEAREST)
when the least significant BITS are truncated. BITS cannot be
zero. */
integerPart
ulpsFromBoundary(const integerPart *parts, unsigned int bits, bool isNearest)
{
unsigned int count, partBits;
integerPart part, boundary;
assert (bits != 0);
bits--;
count = bits / integerPartWidth;
partBits = bits % integerPartWidth + 1;
part = parts[count] & (~(integerPart) 0 >> (integerPartWidth - partBits));
if (isNearest)
boundary = (integerPart) 1 << (partBits - 1);
else
boundary = 0;
if (count == 0) {
if (part - boundary <= boundary - part)
return part - boundary;
else
return boundary - part;
}
if (part == boundary) {
while (--count)
if (parts[count])
return ~(integerPart) 0; /* A lot. */
return parts[0];
} else if (part == boundary - 1) {
while (--count)
if (~parts[count])
return ~(integerPart) 0; /* A lot. */
return -parts[0];
}
return ~(integerPart) 0; /* A lot. */
}
/* Place pow(5, power) in DST, and return the number of parts used.
DST must be at least one part larger than size of the answer. */
unsigned int
powerOf5(integerPart *dst, unsigned int power)
{
static integerPart firstEightPowers[] = { 1, 5, 25, 125, 625, 3125,
15625, 78125 };
static integerPart pow5s[maxPowerOfFiveParts * 2 + 5] = { 78125 * 5 };
static unsigned int partsCount[16] = { 1 };
integerPart scratch[maxPowerOfFiveParts], *p1, *p2, *pow5;
unsigned int result;
assert(power <= maxExponent);
p1 = dst;
p2 = scratch;
*p1 = firstEightPowers[power & 7];
power >>= 3;
result = 1;
pow5 = pow5s;
for (unsigned int n = 0; power; power >>= 1, n++) {
unsigned int pc;
pc = partsCount[n];
/* Calculate pow(5,pow(2,n+3)) if we haven't yet. */
if (pc == 0) {
pc = partsCount[n - 1];
APInt::tcFullMultiply(pow5, pow5 - pc, pow5 - pc, pc, pc);
pc *= 2;
if (pow5[pc - 1] == 0)
pc--;
partsCount[n] = pc;
}
if (power & 1) {
integerPart *tmp;
APInt::tcFullMultiply(p2, p1, pow5, result, pc);
result += pc;
if (p2[result - 1] == 0)
result--;
/* Now result is in p1 with partsCount parts and p2 is scratch
space. */
tmp = p1, p1 = p2, p2 = tmp;
}
pow5 += pc;
}
if (p1 != dst)
APInt::tcAssign(dst, p1, result);
return result;
}
/* Zero at the end to avoid modular arithmetic when adding one; used
when rounding up during hexadecimal output. */
static const char hexDigitsLower[] = "0123456789abcdef0";
static const char hexDigitsUpper[] = "0123456789ABCDEF0";
static const char infinityL[] = "infinity";
static const char infinityU[] = "INFINITY";
static const char NaNL[] = "nan";
static const char NaNU[] = "NAN";
/* Write out an integerPart in hexadecimal, starting with the most
significant nibble. Write out exactly COUNT hexdigits, return
COUNT. */
unsigned int
partAsHex (char *dst, integerPart part, unsigned int count,
const char *hexDigitChars)
{
unsigned int result = count;
assert (count != 0 && count <= integerPartWidth / 4);
part >>= (integerPartWidth - 4 * count);
while (count--) {
dst[count] = hexDigitChars[part & 0xf];
part >>= 4;
}
return result;
}
/* Write out an unsigned decimal integer. */
char *
writeUnsignedDecimal (char *dst, unsigned int n)
{
char buff[40], *p;
p = buff;
do
*p++ = '0' + n % 10;
while (n /= 10);
do
*dst++ = *--p;
while (p != buff);
return dst;
}
/* Write out a signed decimal integer. */
char *
writeSignedDecimal (char *dst, int value)
{
if (value < 0) {
*dst++ = '-';
dst = writeUnsignedDecimal(dst, -(unsigned) value);
} else
dst = writeUnsignedDecimal(dst, value);
return dst;
}
}
/* Constructors. */
void
APFloat::initialize(const fltSemantics *ourSemantics)
{
unsigned int count;
semantics = ourSemantics;
count = partCount();
if(count > 1)
significand.parts = new integerPart[count];
}
void
APFloat::freeSignificand()
{
if(partCount() > 1)
delete [] significand.parts;
}
void
APFloat::assign(const APFloat &rhs)
{
assert(semantics == rhs.semantics);
sign = rhs.sign;
category = rhs.category;
exponent = rhs.exponent;
sign2 = rhs.sign2;
exponent2 = rhs.exponent2;
if(category == fcNormal || category == fcNaN)
copySignificand(rhs);
}
void
APFloat::copySignificand(const APFloat &rhs)
{
assert(category == fcNormal || category == fcNaN);
assert(rhs.partCount() >= partCount());
APInt::tcAssign(significandParts(), rhs.significandParts(),
partCount());
}
/* Make this number a NaN, with an arbitrary but deterministic value
for the significand. */
void
APFloat::makeNaN(void)
{
category = fcNaN;
APInt::tcSet(significandParts(), ~0U, partCount());
}
APFloat &
APFloat::operator=(const APFloat &rhs)
{
if(this != &rhs) {
if(semantics != rhs.semantics) {
freeSignificand();
initialize(rhs.semantics);
}
assign(rhs);
}
return *this;
}
bool
APFloat::bitwiseIsEqual(const APFloat &rhs) const {
if (this == &rhs)
return true;
if (semantics != rhs.semantics ||
category != rhs.category ||
sign != rhs.sign)
return false;
if (semantics==(const llvm::fltSemantics* const)&PPCDoubleDouble &&
sign2 != rhs.sign2)
return false;
if (category==fcZero || category==fcInfinity)
return true;
else if (category==fcNormal && exponent!=rhs.exponent)
return false;
else if (semantics==(const llvm::fltSemantics* const)&PPCDoubleDouble &&
exponent2!=rhs.exponent2)
return false;
else {
int i= partCount();
const integerPart* p=significandParts();
const integerPart* q=rhs.significandParts();
for (; i>0; i--, p++, q++) {
if (*p != *q)
return false;
}
return true;
}
}
APFloat::APFloat(const fltSemantics &ourSemantics, integerPart value)
{
assertArithmeticOK(ourSemantics);
initialize(&ourSemantics);
sign = 0;
zeroSignificand();
exponent = ourSemantics.precision - 1;
significandParts()[0] = value;
normalize(rmNearestTiesToEven, lfExactlyZero);
}
APFloat::APFloat(const fltSemantics &ourSemantics,
fltCategory ourCategory, bool negative)
{
assertArithmeticOK(ourSemantics);
initialize(&ourSemantics);
category = ourCategory;
sign = negative;
if(category == fcNormal)
category = fcZero;
else if (ourCategory == fcNaN)
makeNaN();
}
APFloat::APFloat(const fltSemantics &ourSemantics, const char *text)
{
assertArithmeticOK(ourSemantics);
initialize(&ourSemantics);
convertFromString(text, rmNearestTiesToEven);
}
APFloat::APFloat(const APFloat &rhs)
{
initialize(rhs.semantics);
assign(rhs);
}
APFloat::~APFloat()
{
freeSignificand();
}
unsigned int
APFloat::partCount() const
{
return partCountForBits(semantics->precision + 1);
}
unsigned int
APFloat::semanticsPrecision(const fltSemantics &semantics)
{
return semantics.precision;
}
const integerPart *
APFloat::significandParts() const
{
return const_cast<APFloat *>(this)->significandParts();
}
integerPart *
APFloat::significandParts()
{
assert(category == fcNormal || category == fcNaN);
if(partCount() > 1)
return significand.parts;
else
return &significand.part;
}
void
APFloat::zeroSignificand()
{
category = fcNormal;
APInt::tcSet(significandParts(), 0, partCount());
}
/* Increment an fcNormal floating point number's significand. */
void
APFloat::incrementSignificand()
{
integerPart carry;
carry = APInt::tcIncrement(significandParts(), partCount());
/* Our callers should never cause us to overflow. */
assert(carry == 0);
}
/* Add the significand of the RHS. Returns the carry flag. */
integerPart
APFloat::addSignificand(const APFloat &rhs)
{
integerPart *parts;
parts = significandParts();
assert(semantics == rhs.semantics);
assert(exponent == rhs.exponent);
return APInt::tcAdd(parts, rhs.significandParts(), 0, partCount());
}
/* Subtract the significand of the RHS with a borrow flag. Returns
the borrow flag. */
integerPart
APFloat::subtractSignificand(const APFloat &rhs, integerPart borrow)
{
integerPart *parts;
parts = significandParts();
assert(semantics == rhs.semantics);
assert(exponent == rhs.exponent);
return APInt::tcSubtract(parts, rhs.significandParts(), borrow,
partCount());
}
/* Multiply the significand of the RHS. If ADDEND is non-NULL, add it
on to the full-precision result of the multiplication. Returns the
lost fraction. */
lostFraction
APFloat::multiplySignificand(const APFloat &rhs, const APFloat *addend)
{
unsigned int omsb; // One, not zero, based MSB.
unsigned int partsCount, newPartsCount, precision;
integerPart *lhsSignificand;
integerPart scratch[4];
integerPart *fullSignificand;
lostFraction lost_fraction;
assert(semantics == rhs.semantics);
precision = semantics->precision;
newPartsCount = partCountForBits(precision * 2);
if(newPartsCount > 4)
fullSignificand = new integerPart[newPartsCount];
else
fullSignificand = scratch;
lhsSignificand = significandParts();
partsCount = partCount();
APInt::tcFullMultiply(fullSignificand, lhsSignificand,
rhs.significandParts(), partsCount, partsCount);
lost_fraction = lfExactlyZero;
omsb = APInt::tcMSB(fullSignificand, newPartsCount) + 1;
exponent += rhs.exponent;
if(addend) {
Significand savedSignificand = significand;
const fltSemantics *savedSemantics = semantics;
fltSemantics extendedSemantics;
opStatus status;
unsigned int extendedPrecision;
/* Normalize our MSB. */
extendedPrecision = precision + precision - 1;
if(omsb != extendedPrecision)
{
APInt::tcShiftLeft(fullSignificand, newPartsCount,
extendedPrecision - omsb);
exponent -= extendedPrecision - omsb;
}
/* Create new semantics. */
extendedSemantics = *semantics;
extendedSemantics.precision = extendedPrecision;
if(newPartsCount == 1)
significand.part = fullSignificand[0];
else
significand.parts = fullSignificand;
semantics = &extendedSemantics;
APFloat extendedAddend(*addend);
status = extendedAddend.convert(extendedSemantics, rmTowardZero);
assert(status == opOK);
lost_fraction = addOrSubtractSignificand(extendedAddend, false);
/* Restore our state. */
if(newPartsCount == 1)
fullSignificand[0] = significand.part;
significand = savedSignificand;
semantics = savedSemantics;
omsb = APInt::tcMSB(fullSignificand, newPartsCount) + 1;
}
exponent -= (precision - 1);
if(omsb > precision) {
unsigned int bits, significantParts;
lostFraction lf;
bits = omsb - precision;
significantParts = partCountForBits(omsb);
lf = shiftRight(fullSignificand, significantParts, bits);
lost_fraction = combineLostFractions(lf, lost_fraction);
exponent += bits;
}
APInt::tcAssign(lhsSignificand, fullSignificand, partsCount);
if(newPartsCount > 4)
delete [] fullSignificand;
return lost_fraction;
}
/* Multiply the significands of LHS and RHS to DST. */
lostFraction
APFloat::divideSignificand(const APFloat &rhs)
{
unsigned int bit, i, partsCount;
const integerPart *rhsSignificand;
integerPart *lhsSignificand, *dividend, *divisor;
integerPart scratch[4];
lostFraction lost_fraction;
assert(semantics == rhs.semantics);
lhsSignificand = significandParts();
rhsSignificand = rhs.significandParts();
partsCount = partCount();
if(partsCount > 2)
dividend = new integerPart[partsCount * 2];
else
dividend = scratch;
divisor = dividend + partsCount;
/* Copy the dividend and divisor as they will be modified in-place. */
for(i = 0; i < partsCount; i++) {
dividend[i] = lhsSignificand[i];
divisor[i] = rhsSignificand[i];
lhsSignificand[i] = 0;
}
exponent -= rhs.exponent;
unsigned int precision = semantics->precision;
/* Normalize the divisor. */
bit = precision - APInt::tcMSB(divisor, partsCount) - 1;
if(bit) {
exponent += bit;
APInt::tcShiftLeft(divisor, partsCount, bit);
}
/* Normalize the dividend. */
bit = precision - APInt::tcMSB(dividend, partsCount) - 1;
if(bit) {
exponent -= bit;
APInt::tcShiftLeft(dividend, partsCount, bit);
}
/* Ensure the dividend >= divisor initially for the loop below.
Incidentally, this means that the division loop below is
guaranteed to set the integer bit to one. */
if(APInt::tcCompare(dividend, divisor, partsCount) < 0) {
exponent--;
APInt::tcShiftLeft(dividend, partsCount, 1);
assert(APInt::tcCompare(dividend, divisor, partsCount) >= 0);
}
/* Long division. */
for(bit = precision; bit; bit -= 1) {
if(APInt::tcCompare(dividend, divisor, partsCount) >= 0) {
APInt::tcSubtract(dividend, divisor, 0, partsCount);
APInt::tcSetBit(lhsSignificand, bit - 1);
}
APInt::tcShiftLeft(dividend, partsCount, 1);
}
/* Figure out the lost fraction. */
int cmp = APInt::tcCompare(dividend, divisor, partsCount);
if(cmp > 0)
lost_fraction = lfMoreThanHalf;
else if(cmp == 0)
lost_fraction = lfExactlyHalf;
else if(APInt::tcIsZero(dividend, partsCount))
lost_fraction = lfExactlyZero;
else
lost_fraction = lfLessThanHalf;
if(partsCount > 2)
delete [] dividend;
return lost_fraction;
}
unsigned int
APFloat::significandMSB() const
{
return APInt::tcMSB(significandParts(), partCount());
}
unsigned int
APFloat::significandLSB() const
{
return APInt::tcLSB(significandParts(), partCount());
}
/* Note that a zero result is NOT normalized to fcZero. */
lostFraction
APFloat::shiftSignificandRight(unsigned int bits)
{
/* Our exponent should not overflow. */
assert((exponent_t) (exponent + bits) >= exponent);
exponent += bits;
return shiftRight(significandParts(), partCount(), bits);
}
/* Shift the significand left BITS bits, subtract BITS from its exponent. */
void
APFloat::shiftSignificandLeft(unsigned int bits)
{
assert(bits < semantics->precision);
if(bits) {
unsigned int partsCount = partCount();
APInt::tcShiftLeft(significandParts(), partsCount, bits);
exponent -= bits;
assert(!APInt::tcIsZero(significandParts(), partsCount));
}
}
APFloat::cmpResult
APFloat::compareAbsoluteValue(const APFloat &rhs) const
{
int compare;
assert(semantics == rhs.semantics);
assert(category == fcNormal);
assert(rhs.category == fcNormal);
compare = exponent - rhs.exponent;
/* If exponents are equal, do an unsigned bignum comparison of the
significands. */
if(compare == 0)
compare = APInt::tcCompare(significandParts(), rhs.significandParts(),
partCount());
if(compare > 0)
return cmpGreaterThan;
else if(compare < 0)
return cmpLessThan;
else
return cmpEqual;
}
/* Handle overflow. Sign is preserved. We either become infinity or
the largest finite number. */
APFloat::opStatus
APFloat::handleOverflow(roundingMode rounding_mode)
{
/* Infinity? */
if(rounding_mode == rmNearestTiesToEven
|| rounding_mode == rmNearestTiesToAway
|| (rounding_mode == rmTowardPositive && !sign)
|| (rounding_mode == rmTowardNegative && sign))
{
category = fcInfinity;
return (opStatus) (opOverflow | opInexact);
}
/* Otherwise we become the largest finite number. */
category = fcNormal;
exponent = semantics->maxExponent;
APInt::tcSetLeastSignificantBits(significandParts(), partCount(),
semantics->precision);
return opInexact;
}
/* Returns TRUE if, when truncating the current number, with BIT the
new LSB, with the given lost fraction and rounding mode, the result
would need to be rounded away from zero (i.e., by increasing the
signficand). This routine must work for fcZero of both signs, and
fcNormal numbers. */
bool
APFloat::roundAwayFromZero(roundingMode rounding_mode,
lostFraction lost_fraction,
unsigned int bit) const
{
/* NaNs and infinities should not have lost fractions. */
assert(category == fcNormal || category == fcZero);
/* Current callers never pass this so we don't handle it. */
assert(lost_fraction != lfExactlyZero);
switch(rounding_mode) {
default:
assert(0);
case rmNearestTiesToAway:
return lost_fraction == lfExactlyHalf || lost_fraction == lfMoreThanHalf;
case rmNearestTiesToEven:
if(lost_fraction == lfMoreThanHalf)
return true;
/* Our zeroes don't have a significand to test. */
if(lost_fraction == lfExactlyHalf && category != fcZero)
return APInt::tcExtractBit(significandParts(), bit);
return false;
case rmTowardZero:
return false;
case rmTowardPositive:
return sign == false;
case rmTowardNegative:
return sign == true;
}
}
APFloat::opStatus
APFloat::normalize(roundingMode rounding_mode,
lostFraction lost_fraction)
{
unsigned int omsb; /* One, not zero, based MSB. */
int exponentChange;
if(category != fcNormal)
return opOK;
/* Before rounding normalize the exponent of fcNormal numbers. */
omsb = significandMSB() + 1;
if(omsb) {
/* OMSB is numbered from 1. We want to place it in the integer
bit numbered PRECISON if possible, with a compensating change in
the exponent. */
exponentChange = omsb - semantics->precision;
/* If the resulting exponent is too high, overflow according to
the rounding mode. */
if(exponent + exponentChange > semantics->maxExponent)
return handleOverflow(rounding_mode);
/* Subnormal numbers have exponent minExponent, and their MSB
is forced based on that. */
if(exponent + exponentChange < semantics->minExponent)
exponentChange = semantics->minExponent - exponent;
/* Shifting left is easy as we don't lose precision. */
if(exponentChange < 0) {
assert(lost_fraction == lfExactlyZero);
shiftSignificandLeft(-exponentChange);
return opOK;
}
if(exponentChange > 0) {
lostFraction lf;
/* Shift right and capture any new lost fraction. */
lf = shiftSignificandRight(exponentChange);
lost_fraction = combineLostFractions(lf, lost_fraction);
/* Keep OMSB up-to-date. */
if(omsb > (unsigned) exponentChange)
omsb -= exponentChange;
else
omsb = 0;
}
}
/* Now round the number according to rounding_mode given the lost
fraction. */
/* As specified in IEEE 754, since we do not trap we do not report
underflow for exact results. */
if(lost_fraction == lfExactlyZero) {
/* Canonicalize zeroes. */
if(omsb == 0)
category = fcZero;
return opOK;
}
/* Increment the significand if we're rounding away from zero. */
if(roundAwayFromZero(rounding_mode, lost_fraction, 0)) {
if(omsb == 0)
exponent = semantics->minExponent;
incrementSignificand();
omsb = significandMSB() + 1;
/* Did the significand increment overflow? */
if(omsb == (unsigned) semantics->precision + 1) {
/* Renormalize by incrementing the exponent and shifting our
significand right one. However if we already have the
maximum exponent we overflow to infinity. */
if(exponent == semantics->maxExponent) {
category = fcInfinity;
return (opStatus) (opOverflow | opInexact);
}
shiftSignificandRight(1);
return opInexact;
}
}
/* The normal case - we were and are not denormal, and any
significand increment above didn't overflow. */
if(omsb == semantics->precision)
return opInexact;
/* We have a non-zero denormal. */
assert(omsb < semantics->precision);
/* Canonicalize zeroes. */
if(omsb == 0)
category = fcZero;
/* The fcZero case is a denormal that underflowed to zero. */
return (opStatus) (opUnderflow | opInexact);
}
APFloat::opStatus
APFloat::addOrSubtractSpecials(const APFloat &rhs, bool subtract)
{
switch(convolve(category, rhs.category)) {
default:
assert(0);
case convolve(fcNaN, fcZero):
case convolve(fcNaN, fcNormal):
case convolve(fcNaN, fcInfinity):
case convolve(fcNaN, fcNaN):
case convolve(fcNormal, fcZero):
case convolve(fcInfinity, fcNormal):
case convolve(fcInfinity, fcZero):
return opOK;
case convolve(fcZero, fcNaN):
case convolve(fcNormal, fcNaN):
case convolve(fcInfinity, fcNaN):
category = fcNaN;
copySignificand(rhs);
return opOK;
case convolve(fcNormal, fcInfinity):
case convolve(fcZero, fcInfinity):
category = fcInfinity;
sign = rhs.sign ^ subtract;
return opOK;
case convolve(fcZero, fcNormal):
assign(rhs);
sign = rhs.sign ^ subtract;
return opOK;
case convolve(fcZero, fcZero):
/* Sign depends on rounding mode; handled by caller. */
return opOK;
case convolve(fcInfinity, fcInfinity):
/* Differently signed infinities can only be validly
subtracted. */
if((sign ^ rhs.sign) != subtract) {
makeNaN();
return opInvalidOp;
}
return opOK;
case convolve(fcNormal, fcNormal):
return opDivByZero;
}
}
/* Add or subtract two normal numbers. */
lostFraction
APFloat::addOrSubtractSignificand(const APFloat &rhs, bool subtract)
{
integerPart carry;
lostFraction lost_fraction;
int bits;
/* Determine if the operation on the absolute values is effectively
an addition or subtraction. */
subtract ^= (sign ^ rhs.sign) ? true : false;
/* Are we bigger exponent-wise than the RHS? */
bits = exponent - rhs.exponent;
/* Subtraction is more subtle than one might naively expect. */
if(subtract) {
APFloat temp_rhs(rhs);
bool reverse;
if (bits == 0) {
reverse = compareAbsoluteValue(temp_rhs) == cmpLessThan;
lost_fraction = lfExactlyZero;
} else if (bits > 0) {
lost_fraction = temp_rhs.shiftSignificandRight(bits - 1);
shiftSignificandLeft(1);
reverse = false;
} else {
lost_fraction = shiftSignificandRight(-bits - 1);
temp_rhs.shiftSignificandLeft(1);
reverse = true;
}
if (reverse) {
carry = temp_rhs.subtractSignificand
(*this, lost_fraction != lfExactlyZero);
copySignificand(temp_rhs);
sign = !sign;
} else {
carry = subtractSignificand
(temp_rhs, lost_fraction != lfExactlyZero);
}
/* Invert the lost fraction - it was on the RHS and
subtracted. */
if(lost_fraction == lfLessThanHalf)
lost_fraction = lfMoreThanHalf;
else if(lost_fraction == lfMoreThanHalf)
lost_fraction = lfLessThanHalf;
/* The code above is intended to ensure that no borrow is
necessary. */
assert(!carry);
} else {
if(bits > 0) {
APFloat temp_rhs(rhs);
lost_fraction = temp_rhs.shiftSignificandRight(bits);
carry = addSignificand(temp_rhs);
} else {
lost_fraction = shiftSignificandRight(-bits);
carry = addSignificand(rhs);
}
/* We have a guard bit; generating a carry cannot happen. */
assert(!carry);
}
return lost_fraction;
}
APFloat::opStatus
APFloat::multiplySpecials(const APFloat &rhs)
{
switch(convolve(category, rhs.category)) {
default:
assert(0);
case convolve(fcNaN, fcZero):
case convolve(fcNaN, fcNormal):
case convolve(fcNaN, fcInfinity):
case convolve(fcNaN, fcNaN):
return opOK;
case convolve(fcZero, fcNaN):
case convolve(fcNormal, fcNaN):
case convolve(fcInfinity, fcNaN):
category = fcNaN;
copySignificand(rhs);
return opOK;
case convolve(fcNormal, fcInfinity):
case convolve(fcInfinity, fcNormal):
case convolve(fcInfinity, fcInfinity):
category = fcInfinity;
return opOK;
case convolve(fcZero, fcNormal):
case convolve(fcNormal, fcZero):
case convolve(fcZero, fcZero):
category = fcZero;
return opOK;
case convolve(fcZero, fcInfinity):
case convolve(fcInfinity, fcZero):
makeNaN();
return opInvalidOp;
case convolve(fcNormal, fcNormal):
return opOK;
}
}
APFloat::opStatus
APFloat::divideSpecials(const APFloat &rhs)
{
switch(convolve(category, rhs.category)) {
default:
assert(0);
case convolve(fcNaN, fcZero):
case convolve(fcNaN, fcNormal):
case convolve(fcNaN, fcInfinity):
case convolve(fcNaN, fcNaN):
case convolve(fcInfinity, fcZero):
case convolve(fcInfinity, fcNormal):
case convolve(fcZero, fcInfinity):
case convolve(fcZero, fcNormal):
return opOK;
case convolve(fcZero, fcNaN):
case convolve(fcNormal, fcNaN):
case convolve(fcInfinity, fcNaN):
category = fcNaN;
copySignificand(rhs);
return opOK;
case convolve(fcNormal, fcInfinity):
category = fcZero;
return opOK;
case convolve(fcNormal, fcZero):
category = fcInfinity;
return opDivByZero;
case convolve(fcInfinity, fcInfinity):
case convolve(fcZero, fcZero):
makeNaN();
return opInvalidOp;
case convolve(fcNormal, fcNormal):
return opOK;
}
}
/* Change sign. */
void
APFloat::changeSign()
{
/* Look mummy, this one's easy. */
sign = !sign;
}
void
APFloat::clearSign()
{
/* So is this one. */
sign = 0;
}
void
APFloat::copySign(const APFloat &rhs)
{
/* And this one. */
sign = rhs.sign;
}
/* Normalized addition or subtraction. */
APFloat::opStatus
APFloat::addOrSubtract(const APFloat &rhs, roundingMode rounding_mode,
bool subtract)
{
opStatus fs;
assertArithmeticOK(*semantics);
fs = addOrSubtractSpecials(rhs, subtract);
/* This return code means it was not a simple case. */
if(fs == opDivByZero) {
lostFraction lost_fraction;
lost_fraction = addOrSubtractSignificand(rhs, subtract);
fs = normalize(rounding_mode, lost_fraction);
/* Can only be zero if we lost no fraction. */
assert(category != fcZero || lost_fraction == lfExactlyZero);
}
/* If two numbers add (exactly) to zero, IEEE 754 decrees it is a
positive zero unless rounding to minus infinity, except that
adding two like-signed zeroes gives that zero. */
if(category == fcZero) {
if(rhs.category != fcZero || (sign == rhs.sign) == subtract)
sign = (rounding_mode == rmTowardNegative);
}
return fs;
}
/* Normalized addition. */
APFloat::opStatus
APFloat::add(const APFloat &rhs, roundingMode rounding_mode)
{
return addOrSubtract(rhs, rounding_mode, false);
}
/* Normalized subtraction. */
APFloat::opStatus
APFloat::subtract(const APFloat &rhs, roundingMode rounding_mode)
{
return addOrSubtract(rhs, rounding_mode, true);
}
/* Normalized multiply. */
APFloat::opStatus
APFloat::multiply(const APFloat &rhs, roundingMode rounding_mode)
{
opStatus fs;
assertArithmeticOK(*semantics);
sign ^= rhs.sign;
fs = multiplySpecials(rhs);
if(category == fcNormal) {
lostFraction lost_fraction = multiplySignificand(rhs, 0);
fs = normalize(rounding_mode, lost_fraction);
if(lost_fraction != lfExactlyZero)
fs = (opStatus) (fs | opInexact);
}
return fs;
}
/* Normalized divide. */
APFloat::opStatus
APFloat::divide(const APFloat &rhs, roundingMode rounding_mode)
{
opStatus fs;
assertArithmeticOK(*semantics);
sign ^= rhs.sign;
fs = divideSpecials(rhs);
if(category == fcNormal) {
lostFraction lost_fraction = divideSignificand(rhs);
fs = normalize(rounding_mode, lost_fraction);
if(lost_fraction != lfExactlyZero)
fs = (opStatus) (fs | opInexact);
}
return fs;
}
/* Normalized remainder. This is not currently doing TRT. */
APFloat::opStatus
APFloat::mod(const APFloat &rhs, roundingMode rounding_mode)
{
opStatus fs;
APFloat V = *this;
unsigned int origSign = sign;
assertArithmeticOK(*semantics);
fs = V.divide(rhs, rmNearestTiesToEven);
if (fs == opDivByZero)
return fs;
int parts = partCount();
integerPart *x = new integerPart[parts];
fs = V.convertToInteger(x, parts * integerPartWidth, true,
rmNearestTiesToEven);
if (fs==opInvalidOp)
return fs;
fs = V.convertFromZeroExtendedInteger(x, parts * integerPartWidth, true,
rmNearestTiesToEven);
assert(fs==opOK); // should always work
fs = V.multiply(rhs, rounding_mode);
assert(fs==opOK || fs==opInexact); // should not overflow or underflow
fs = subtract(V, rounding_mode);
assert(fs==opOK || fs==opInexact); // likewise
if (isZero())
sign = origSign; // IEEE754 requires this
delete[] x;
return fs;
}
/* Normalized fused-multiply-add. */
APFloat::opStatus
APFloat::fusedMultiplyAdd(const APFloat &multiplicand,
const APFloat &addend,
roundingMode rounding_mode)
{
opStatus fs;
assertArithmeticOK(*semantics);
/* Post-multiplication sign, before addition. */
sign ^= multiplicand.sign;
/* If and only if all arguments are normal do we need to do an
extended-precision calculation. */
if(category == fcNormal
&& multiplicand.category == fcNormal
&& addend.category == fcNormal) {
lostFraction lost_fraction;
lost_fraction = multiplySignificand(multiplicand, &addend);
fs = normalize(rounding_mode, lost_fraction);
if(lost_fraction != lfExactlyZero)
fs = (opStatus) (fs | opInexact);
/* If two numbers add (exactly) to zero, IEEE 754 decrees it is a
positive zero unless rounding to minus infinity, except that
adding two like-signed zeroes gives that zero. */
if(category == fcZero && sign != addend.sign)
sign = (rounding_mode == rmTowardNegative);
} else {
fs = multiplySpecials(multiplicand);
/* FS can only be opOK or opInvalidOp. There is no more work
to do in the latter case. The IEEE-754R standard says it is
implementation-defined in this case whether, if ADDEND is a
quiet NaN, we raise invalid op; this implementation does so.
If we need to do the addition we can do so with normal
precision. */
if(fs == opOK)
fs = addOrSubtract(addend, rounding_mode, false);
}
return fs;
}
/* Comparison requires normalized numbers. */
APFloat::cmpResult
APFloat::compare(const APFloat &rhs) const
{
cmpResult result;
assertArithmeticOK(*semantics);
assert(semantics == rhs.semantics);
switch(convolve(category, rhs.category)) {
default:
assert(0);
case convolve(fcNaN, fcZero):
case convolve(fcNaN, fcNormal):
case convolve(fcNaN, fcInfinity):
case convolve(fcNaN, fcNaN):
case convolve(fcZero, fcNaN):
case convolve(fcNormal, fcNaN):
case convolve(fcInfinity, fcNaN):
return cmpUnordered;
case convolve(fcInfinity, fcNormal):
case convolve(fcInfinity, fcZero):
case convolve(fcNormal, fcZero):
if(sign)
return cmpLessThan;
else
return cmpGreaterThan;
case convolve(fcNormal, fcInfinity):
case convolve(fcZero, fcInfinity):
case convolve(fcZero, fcNormal):
if(rhs.sign)
return cmpGreaterThan;
else
return cmpLessThan;
case convolve(fcInfinity, fcInfinity):
if(sign == rhs.sign)
return cmpEqual;
else if(sign)
return cmpLessThan;
else
return cmpGreaterThan;
case convolve(fcZero, fcZero):
return cmpEqual;
case convolve(fcNormal, fcNormal):
break;
}
/* Two normal numbers. Do they have the same sign? */
if(sign != rhs.sign) {
if(sign)
result = cmpLessThan;
else
result = cmpGreaterThan;
} else {
/* Compare absolute values; invert result if negative. */
result = compareAbsoluteValue(rhs);
if(sign) {
if(result == cmpLessThan)
result = cmpGreaterThan;
else if(result == cmpGreaterThan)
result = cmpLessThan;
}
}
return result;
}
APFloat::opStatus
APFloat::convert(const fltSemantics &toSemantics,
roundingMode rounding_mode)
{
lostFraction lostFraction;
unsigned int newPartCount, oldPartCount;
opStatus fs;
assertArithmeticOK(*semantics);
lostFraction = lfExactlyZero;
newPartCount = partCountForBits(toSemantics.precision + 1);
oldPartCount = partCount();
/* Handle storage complications. If our new form is wider,
re-allocate our bit pattern into wider storage. If it is
narrower, we ignore the excess parts, but if narrowing to a
single part we need to free the old storage.
Be careful not to reference significandParts for zeroes
and infinities, since it aborts. */
if (newPartCount > oldPartCount) {
integerPart *newParts;
newParts = new integerPart[newPartCount];
APInt::tcSet(newParts, 0, newPartCount);
if (category==fcNormal || category==fcNaN)
APInt::tcAssign(newParts, significandParts(), oldPartCount);
freeSignificand();
significand.parts = newParts;
} else if (newPartCount < oldPartCount) {
/* Capture any lost fraction through truncation of parts so we get
correct rounding whilst normalizing. */
if (category==fcNormal)
lostFraction = lostFractionThroughTruncation
(significandParts(), oldPartCount, toSemantics.precision);
if (newPartCount == 1) {
integerPart newPart = 0;
if (category==fcNormal || category==fcNaN)
newPart = significandParts()[0];
freeSignificand();
significand.part = newPart;
}
}
if(category == fcNormal) {
/* Re-interpret our bit-pattern. */
exponent += toSemantics.precision - semantics->precision;
semantics = &toSemantics;
fs = normalize(rounding_mode, lostFraction);
} else if (category == fcNaN) {
int shift = toSemantics.precision - semantics->precision;
// No normalization here, just truncate
if (shift>0)
APInt::tcShiftLeft(significandParts(), newPartCount, shift);
else if (shift < 0)
APInt::tcShiftRight(significandParts(), newPartCount, -shift);
// gcc forces the Quiet bit on, which means (float)(double)(float_sNan)
// does not give you back the same bits. This is dubious, and we
// don't currently do it. You're really supposed to get
// an invalid operation signal at runtime, but nobody does that.
semantics = &toSemantics;
fs = opOK;
} else {
semantics = &toSemantics;
fs = opOK;
}
return fs;
}
/* Convert a floating point number to an integer according to the
rounding mode. If the rounded integer value is out of range this
returns an invalid operation exception and the contents of the
destination parts are unspecified. If the rounded value is in
range but the floating point number is not the exact integer, the C
standard doesn't require an inexact exception to be raised. IEEE
854 does require it so we do that.
Note that for conversions to integer type the C standard requires
round-to-zero to always be used. */
APFloat::opStatus
APFloat::convertToSignExtendedInteger(integerPart *parts, unsigned int width,
bool isSigned,
roundingMode rounding_mode) const
{
lostFraction lost_fraction;
const integerPart *src;
unsigned int dstPartsCount, truncatedBits;
assertArithmeticOK(*semantics);
/* Handle the three special cases first. */
if(category == fcInfinity || category == fcNaN)
return opInvalidOp;
dstPartsCount = partCountForBits(width);
if(category == fcZero) {
APInt::tcSet(parts, 0, dstPartsCount);
return opOK;
}
src = significandParts();
/* Step 1: place our absolute value, with any fraction truncated, in
the destination. */
if (exponent < 0) {
/* Our absolute value is less than one; truncate everything. */
APInt::tcSet(parts, 0, dstPartsCount);
truncatedBits = semantics->precision;
} else {
/* We want the most significant (exponent + 1) bits; the rest are
truncated. */
unsigned int bits = exponent + 1U;
/* Hopelessly large in magnitude? */
if (bits > width)
return opInvalidOp;
if (bits < semantics->precision) {
/* We truncate (semantics->precision - bits) bits. */
truncatedBits = semantics->precision - bits;
APInt::tcExtract(parts, dstPartsCount, src, bits, truncatedBits);
} else {
/* We want at least as many bits as are available. */
APInt::tcExtract(parts, dstPartsCount, src, semantics->precision, 0);
APInt::tcShiftLeft(parts, dstPartsCount, bits - semantics->precision);
truncatedBits = 0;
}
}
/* Step 2: work out any lost fraction, and increment the absolute
value if we would round away from zero. */
if (truncatedBits) {
lost_fraction = lostFractionThroughTruncation(src, partCount(),
truncatedBits);
if (lost_fraction != lfExactlyZero
&& roundAwayFromZero(rounding_mode, lost_fraction, truncatedBits)) {
if (APInt::tcIncrement(parts, dstPartsCount))
return opInvalidOp; /* Overflow. */
}
} else {
lost_fraction = lfExactlyZero;
}
/* Step 3: check if we fit in the destination. */
unsigned int omsb = APInt::tcMSB(parts, dstPartsCount) + 1;
if (sign) {
if (!isSigned) {
/* Negative numbers cannot be represented as unsigned. */
if (omsb != 0)
return opInvalidOp;
} else {
/* It takes omsb bits to represent the unsigned integer value.
We lose a bit for the sign, but care is needed as the
maximally negative integer is a special case. */
if (omsb == width && APInt::tcLSB(parts, dstPartsCount) + 1 != omsb)
return opInvalidOp;
/* This case can happen because of rounding. */
if (omsb > width)
return opInvalidOp;
}
APInt::tcNegate (parts, dstPartsCount);
} else {
if (omsb >= width + !isSigned)
return opInvalidOp;
}
if (lost_fraction == lfExactlyZero)
return opOK;
else
return opInexact;
}
/* Same as convertToSignExtendedInteger, except we provide
deterministic values in case of an invalid operation exception,
namely zero for NaNs and the minimal or maximal value respectively
for underflow or overflow. */
APFloat::opStatus
APFloat::convertToInteger(integerPart *parts, unsigned int width,
bool isSigned,
roundingMode rounding_mode) const
{
opStatus fs;
fs = convertToSignExtendedInteger(parts, width, isSigned, rounding_mode);
if (fs == opInvalidOp) {
unsigned int bits, dstPartsCount;
dstPartsCount = partCountForBits(width);
if (category == fcNaN)
bits = 0;
else if (sign)
bits = isSigned;
else
bits = width - isSigned;
APInt::tcSetLeastSignificantBits(parts, dstPartsCount, bits);
if (sign && isSigned)
APInt::tcShiftLeft(parts, dstPartsCount, width - 1);
}
return fs;
}
/* Convert an unsigned integer SRC to a floating point number,
rounding according to ROUNDING_MODE. The sign of the floating
point number is not modified. */
APFloat::opStatus
APFloat::convertFromUnsignedParts(const integerPart *src,
unsigned int srcCount,
roundingMode rounding_mode)
{
unsigned int omsb, precision, dstCount;
integerPart *dst;
lostFraction lost_fraction;
assertArithmeticOK(*semantics);
category = fcNormal;
omsb = APInt::tcMSB(src, srcCount) + 1;
dst = significandParts();
dstCount = partCount();
precision = semantics->precision;
/* We want the most significant PRECISON bits of SRC. There may not
be that many; extract what we can. */
if (precision <= omsb) {
exponent = omsb - 1;
lost_fraction = lostFractionThroughTruncation(src, srcCount,
omsb - precision);
APInt::tcExtract(dst, dstCount, src, precision, omsb - precision);
} else {
exponent = precision - 1;
lost_fraction = lfExactlyZero;
APInt::tcExtract(dst, dstCount, src, omsb, 0);
}
return normalize(rounding_mode, lost_fraction);
}
/* Convert a two's complement integer SRC to a floating point number,
rounding according to ROUNDING_MODE. ISSIGNED is true if the
integer is signed, in which case it must be sign-extended. */
APFloat::opStatus
APFloat::convertFromSignExtendedInteger(const integerPart *src,
unsigned int srcCount,
bool isSigned,
roundingMode rounding_mode)
{
opStatus status;
assertArithmeticOK(*semantics);
if (isSigned
&& APInt::tcExtractBit(src, srcCount * integerPartWidth - 1)) {
integerPart *copy;
/* If we're signed and negative negate a copy. */
sign = true;
copy = new integerPart[srcCount];
APInt::tcAssign(copy, src, srcCount);
APInt::tcNegate(copy, srcCount);
status = convertFromUnsignedParts(copy, srcCount, rounding_mode);
delete [] copy;
} else {
sign = false;
status = convertFromUnsignedParts(src, srcCount, rounding_mode);
}
return status;
}
/* FIXME: should this just take a const APInt reference? */
APFloat::opStatus
APFloat::convertFromZeroExtendedInteger(const integerPart *parts,
unsigned int width, bool isSigned,
roundingMode rounding_mode)
{
unsigned int partCount = partCountForBits(width);
APInt api = APInt(width, partCount, parts);
sign = false;
if(isSigned && APInt::tcExtractBit(parts, width - 1)) {
sign = true;
api = -api;
}
return convertFromUnsignedParts(api.getRawData(), partCount, rounding_mode);
}
APFloat::opStatus
APFloat::convertFromHexadecimalString(const char *p,
roundingMode rounding_mode)
{
lostFraction lost_fraction;
integerPart *significand;
unsigned int bitPos, partsCount;
const char *dot, *firstSignificantDigit;
zeroSignificand();
exponent = 0;
category = fcNormal;
significand = significandParts();
partsCount = partCount();
bitPos = partsCount * integerPartWidth;
/* Skip leading zeroes and any (hexa)decimal point. */
p = skipLeadingZeroesAndAnyDot(p, &dot);
firstSignificantDigit = p;
for(;;) {
integerPart hex_value;
if(*p == '.') {
assert(dot == 0);
dot = p++;
}
hex_value = hexDigitValue(*p);
if(hex_value == -1U) {
lost_fraction = lfExactlyZero;
break;
}
p++;
/* Store the number whilst 4-bit nibbles remain. */
if(bitPos) {
bitPos -= 4;
hex_value <<= bitPos % integerPartWidth;
significand[bitPos / integerPartWidth] |= hex_value;
} else {
lost_fraction = trailingHexadecimalFraction(p, hex_value);
while(hexDigitValue(*p) != -1U)
p++;
break;
}
}
/* Hex floats require an exponent but not a hexadecimal point. */
assert(*p == 'p' || *p == 'P');
/* Ignore the exponent if we are zero. */
if(p != firstSignificantDigit) {
int expAdjustment;
/* Implicit hexadecimal point? */
if(!dot)
dot = p;
/* Calculate the exponent adjustment implicit in the number of
significant digits. */
expAdjustment = dot - firstSignificantDigit;
if(expAdjustment < 0)
expAdjustment++;
expAdjustment = expAdjustment * 4 - 1;
/* Adjust for writing the significand starting at the most
significant nibble. */
expAdjustment += semantics->precision;
expAdjustment -= partsCount * integerPartWidth;
/* Adjust for the given exponent. */
exponent = totalExponent(p, expAdjustment);
}
return normalize(rounding_mode, lost_fraction);
}
APFloat::opStatus
APFloat::roundSignificandWithExponent(const integerPart *decSigParts,
unsigned sigPartCount, int exp,
roundingMode rounding_mode)
{
unsigned int parts, pow5PartCount;
fltSemantics calcSemantics = { 32767, -32767, 0, true };
integerPart pow5Parts[maxPowerOfFiveParts];
bool isNearest;
isNearest = (rounding_mode == rmNearestTiesToEven
|| rounding_mode == rmNearestTiesToAway);
parts = partCountForBits(semantics->precision + 11);
/* Calculate pow(5, abs(exp)). */
pow5PartCount = powerOf5(pow5Parts, exp >= 0 ? exp: -exp);
for (;; parts *= 2) {
opStatus sigStatus, powStatus;
unsigned int excessPrecision, truncatedBits;
calcSemantics.precision = parts * integerPartWidth - 1;
excessPrecision = calcSemantics.precision - semantics->precision;
truncatedBits = excessPrecision;
APFloat decSig(calcSemantics, fcZero, sign);
APFloat pow5(calcSemantics, fcZero, false);
sigStatus = decSig.convertFromUnsignedParts(decSigParts, sigPartCount,
rmNearestTiesToEven);
powStatus = pow5.convertFromUnsignedParts(pow5Parts, pow5PartCount,
rmNearestTiesToEven);
/* Add exp, as 10^n = 5^n * 2^n. */
decSig.exponent += exp;
lostFraction calcLostFraction;
integerPart HUerr, HUdistance, powHUerr;
if (exp >= 0) {
/* multiplySignificand leaves the precision-th bit set to 1. */
calcLostFraction = decSig.multiplySignificand(pow5, NULL);
powHUerr = powStatus != opOK;
} else {
calcLostFraction = decSig.divideSignificand(pow5);
/* Denormal numbers have less precision. */
if (decSig.exponent < semantics->minExponent) {
excessPrecision += (semantics->minExponent - decSig.exponent);
truncatedBits = excessPrecision;
if (excessPrecision > calcSemantics.precision)
excessPrecision = calcSemantics.precision;
}
/* Extra half-ulp lost in reciprocal of exponent. */
powHUerr = (powStatus == opOK && calcLostFraction == lfExactlyZero) ? 0: 2;
}
/* Both multiplySignificand and divideSignificand return the
result with the integer bit set. */
assert (APInt::tcExtractBit
(decSig.significandParts(), calcSemantics.precision - 1) == 1);
HUerr = HUerrBound(calcLostFraction != lfExactlyZero, sigStatus != opOK,
powHUerr);
HUdistance = 2 * ulpsFromBoundary(decSig.significandParts(),
excessPrecision, isNearest);
/* Are we guaranteed to round correctly if we truncate? */
if (HUdistance >= HUerr) {
APInt::tcExtract(significandParts(), partCount(), decSig.significandParts(),
calcSemantics.precision - excessPrecision,
excessPrecision);
/* Take the exponent of decSig. If we tcExtract-ed less bits
above we must adjust our exponent to compensate for the
implicit right shift. */
exponent = (decSig.exponent + semantics->precision
- (calcSemantics.precision - excessPrecision));
calcLostFraction = lostFractionThroughTruncation(decSig.significandParts(),
decSig.partCount(),
truncatedBits);
return normalize(rounding_mode, calcLostFraction);
}
}
}
APFloat::opStatus
APFloat::convertFromDecimalString(const char *p, roundingMode rounding_mode)
{
decimalInfo D;
opStatus fs;
/* Scan the text. */
interpretDecimal(p, &D);
/* Handle the quick cases. First the case of no significant digits,
i.e. zero, and then exponents that are obviously too large or too
small. Writing L for log 10 / log 2, a number d.ddddd*10^exp
definitely overflows if
(exp - 1) * L >= maxExponent
and definitely underflows to zero where
(exp + 1) * L <= minExponent - precision
With integer arithmetic the tightest bounds for L are
93/28 < L < 196/59 [ numerator <= 256 ]
42039/12655 < L < 28738/8651 [ numerator <= 65536 ]
*/
if (*D.firstSigDigit == '0') {
category = fcZero;
fs = opOK;
} else if ((D.normalizedExponent + 1) * 28738
<= 8651 * (semantics->minExponent - (int) semantics->precision)) {
/* Underflow to zero and round. */
zeroSignificand();
fs = normalize(rounding_mode, lfLessThanHalf);
} else if ((D.normalizedExponent - 1) * 42039
>= 12655 * semantics->maxExponent) {
/* Overflow and round. */
fs = handleOverflow(rounding_mode);
} else {
integerPart *decSignificand;
unsigned int partCount;
/* A tight upper bound on number of bits required to hold an
N-digit decimal integer is N * 196 / 59. Allocate enough space
to hold the full significand, and an extra part required by
tcMultiplyPart. */
partCount = (D.lastSigDigit - D.firstSigDigit) + 1;
partCount = partCountForBits(1 + 196 * partCount / 59);
decSignificand = new integerPart[partCount + 1];
partCount = 0;
/* Convert to binary efficiently - we do almost all multiplication
in an integerPart. When this would overflow do we do a single
bignum multiplication, and then revert again to multiplication
in an integerPart. */
do {
integerPart decValue, val, multiplier;
val = 0;
multiplier = 1;
do {
if (*p == '.')
p++;
decValue = decDigitValue(*p++);
multiplier *= 10;
val = val * 10 + decValue;
/* The maximum number that can be multiplied by ten with any
digit added without overflowing an integerPart. */
} while (p <= D.lastSigDigit && multiplier <= (~ (integerPart) 0 - 9) / 10);
/* Multiply out the current part. */
APInt::tcMultiplyPart(decSignificand, decSignificand, multiplier, val,
partCount, partCount + 1, false);
/* If we used another part (likely but not guaranteed), increase
the count. */
if (decSignificand[partCount])
partCount++;
} while (p <= D.lastSigDigit);
category = fcNormal;
fs = roundSignificandWithExponent(decSignificand, partCount,
D.exponent, rounding_mode);
delete [] decSignificand;
}
return fs;
}
APFloat::opStatus
APFloat::convertFromString(const char *p, roundingMode rounding_mode)
{
assertArithmeticOK(*semantics);
/* Handle a leading minus sign. */
if(*p == '-')
sign = 1, p++;
else
sign = 0;
if(p[0] == '0' && (p[1] == 'x' || p[1] == 'X'))
return convertFromHexadecimalString(p + 2, rounding_mode);
else
return convertFromDecimalString(p, rounding_mode);
}
/* Write out a hexadecimal representation of the floating point value
to DST, which must be of sufficient size, in the C99 form
[-]0xh.hhhhp[+-]d. Return the number of characters written,
excluding the terminating NUL.
If UPPERCASE, the output is in upper case, otherwise in lower case.
HEXDIGITS digits appear altogether, rounding the value if
necessary. If HEXDIGITS is 0, the minimal precision to display the
number precisely is used instead. If nothing would appear after
the decimal point it is suppressed.
The decimal exponent is always printed and has at least one digit.
Zero values display an exponent of zero. Infinities and NaNs
appear as "infinity" or "nan" respectively.
The above rules are as specified by C99. There is ambiguity about
what the leading hexadecimal digit should be. This implementation
uses whatever is necessary so that the exponent is displayed as
stored. This implies the exponent will fall within the IEEE format
range, and the leading hexadecimal digit will be 0 (for denormals),
1 (normal numbers) or 2 (normal numbers rounded-away-from-zero with
any other digits zero).
*/
unsigned int
APFloat::convertToHexString(char *dst, unsigned int hexDigits,
bool upperCase, roundingMode rounding_mode) const
{
char *p;
assertArithmeticOK(*semantics);
p = dst;
if (sign)
*dst++ = '-';
switch (category) {
case fcInfinity:
memcpy (dst, upperCase ? infinityU: infinityL, sizeof infinityU - 1);
dst += sizeof infinityL - 1;
break;
case fcNaN:
memcpy (dst, upperCase ? NaNU: NaNL, sizeof NaNU - 1);
dst += sizeof NaNU - 1;
break;
case fcZero:
*dst++ = '0';
*dst++ = upperCase ? 'X': 'x';
*dst++ = '0';
if (hexDigits > 1) {
*dst++ = '.';
memset (dst, '0', hexDigits - 1);
dst += hexDigits - 1;
}
*dst++ = upperCase ? 'P': 'p';
*dst++ = '0';
break;
case fcNormal:
dst = convertNormalToHexString (dst, hexDigits, upperCase, rounding_mode);
break;
}
*dst = 0;
return dst - p;
}
/* Does the hard work of outputting the correctly rounded hexadecimal
form of a normal floating point number with the specified number of
hexadecimal digits. If HEXDIGITS is zero the minimum number of
digits necessary to print the value precisely is output. */
char *
APFloat::convertNormalToHexString(char *dst, unsigned int hexDigits,
bool upperCase,
roundingMode rounding_mode) const
{
unsigned int count, valueBits, shift, partsCount, outputDigits;
const char *hexDigitChars;
const integerPart *significand;
char *p;
bool roundUp;
*dst++ = '0';
*dst++ = upperCase ? 'X': 'x';
roundUp = false;
hexDigitChars = upperCase ? hexDigitsUpper: hexDigitsLower;
significand = significandParts();
partsCount = partCount();
/* +3 because the first digit only uses the single integer bit, so
we have 3 virtual zero most-significant-bits. */
valueBits = semantics->precision + 3;
shift = integerPartWidth - valueBits % integerPartWidth;
/* The natural number of digits required ignoring trailing
insignificant zeroes. */
outputDigits = (valueBits - significandLSB () + 3) / 4;
/* hexDigits of zero means use the required number for the
precision. Otherwise, see if we are truncating. If we are,
find out if we need to round away from zero. */
if (hexDigits) {
if (hexDigits < outputDigits) {
/* We are dropping non-zero bits, so need to check how to round.
"bits" is the number of dropped bits. */
unsigned int bits;
lostFraction fraction;
bits = valueBits - hexDigits * 4;
fraction = lostFractionThroughTruncation (significand, partsCount, bits);
roundUp = roundAwayFromZero(rounding_mode, fraction, bits);
}
outputDigits = hexDigits;
}
/* Write the digits consecutively, and start writing in the location
of the hexadecimal point. We move the most significant digit
left and add the hexadecimal point later. */
p = ++dst;
count = (valueBits + integerPartWidth - 1) / integerPartWidth;
while (outputDigits && count) {
integerPart part;
/* Put the most significant integerPartWidth bits in "part". */
if (--count == partsCount)
part = 0; /* An imaginary higher zero part. */
else
part = significand[count] << shift;
if (count && shift)
part |= significand[count - 1] >> (integerPartWidth - shift);
/* Convert as much of "part" to hexdigits as we can. */
unsigned int curDigits = integerPartWidth / 4;
if (curDigits > outputDigits)
curDigits = outputDigits;
dst += partAsHex (dst, part, curDigits, hexDigitChars);
outputDigits -= curDigits;
}
if (roundUp) {
char *q = dst;
/* Note that hexDigitChars has a trailing '0'. */
do {
q--;
*q = hexDigitChars[hexDigitValue (*q) + 1];
} while (*q == '0');
assert (q >= p);
} else {
/* Add trailing zeroes. */
memset (dst, '0', outputDigits);
dst += outputDigits;
}
/* Move the most significant digit to before the point, and if there
is something after the decimal point add it. This must come
after rounding above. */
p[-1] = p[0];
if (dst -1 == p)
dst--;
else
p[0] = '.';
/* Finally output the exponent. */
*dst++ = upperCase ? 'P': 'p';
return writeSignedDecimal (dst, exponent);
}
// For good performance it is desirable for different APFloats
// to produce different integers.
uint32_t
APFloat::getHashValue() const
{
if (category==fcZero) return sign<<8 | semantics->precision ;
else if (category==fcInfinity) return sign<<9 | semantics->precision;
else if (category==fcNaN) return 1<<10 | semantics->precision;
else {
uint32_t hash = sign<<11 | semantics->precision | exponent<<12;
const integerPart* p = significandParts();
for (int i=partCount(); i>0; i--, p++)
hash ^= ((uint32_t)*p) ^ (*p)>>32;
return hash;
}
}
// Conversion from APFloat to/from host float/double. It may eventually be
// possible to eliminate these and have everybody deal with APFloats, but that
// will take a while. This approach will not easily extend to long double.
// Current implementation requires integerPartWidth==64, which is correct at
// the moment but could be made more general.
// Denormals have exponent minExponent in APFloat, but minExponent-1 in
// the actual IEEE respresentations. We compensate for that here.
APInt
APFloat::convertF80LongDoubleAPFloatToAPInt() const
{
assert(semantics == (const llvm::fltSemantics* const)&x87DoubleExtended);
assert (partCount()==2);
uint64_t myexponent, mysignificand;
if (category==fcNormal) {
myexponent = exponent+16383; //bias
mysignificand = significandParts()[0];
if (myexponent==1 && !(mysignificand & 0x8000000000000000ULL))
myexponent = 0; // denormal
} else if (category==fcZero) {
myexponent = 0;
mysignificand = 0;
} else if (category==fcInfinity) {
myexponent = 0x7fff;
mysignificand = 0x8000000000000000ULL;
} else {
assert(category == fcNaN && "Unknown category");
myexponent = 0x7fff;
mysignificand = significandParts()[0];
}
uint64_t words[2];
words[0] = (((uint64_t)sign & 1) << 63) |
((myexponent & 0x7fff) << 48) |
((mysignificand >>16) & 0xffffffffffffLL);
words[1] = mysignificand & 0xffff;
return APInt(80, 2, words);
}
APInt
APFloat::convertPPCDoubleDoubleAPFloatToAPInt() const
{
assert(semantics == (const llvm::fltSemantics* const)&PPCDoubleDouble);
assert (partCount()==2);
uint64_t myexponent, mysignificand, myexponent2, mysignificand2;
if (category==fcNormal) {
myexponent = exponent + 1023; //bias
myexponent2 = exponent2 + 1023;
mysignificand = significandParts()[0];
mysignificand2 = significandParts()[1];
if (myexponent==1 && !(mysignificand & 0x10000000000000LL))
myexponent = 0; // denormal
if (myexponent2==1 && !(mysignificand2 & 0x10000000000000LL))
myexponent2 = 0; // denormal
} else if (category==fcZero) {
myexponent = 0;
mysignificand = 0;
myexponent2 = 0;
mysignificand2 = 0;
} else if (category==fcInfinity) {
myexponent = 0x7ff;
myexponent2 = 0;
mysignificand = 0;
mysignificand2 = 0;
} else {
assert(category == fcNaN && "Unknown category");
myexponent = 0x7ff;
mysignificand = significandParts()[0];
myexponent2 = exponent2;
mysignificand2 = significandParts()[1];
}
uint64_t words[2];
words[0] = (((uint64_t)sign & 1) << 63) |
((myexponent & 0x7ff) << 52) |
(mysignificand & 0xfffffffffffffLL);
words[1] = (((uint64_t)sign2 & 1) << 63) |
((myexponent2 & 0x7ff) << 52) |
(mysignificand2 & 0xfffffffffffffLL);
return APInt(128, 2, words);
}
APInt
APFloat::convertDoubleAPFloatToAPInt() const
{
assert(semantics == (const llvm::fltSemantics*)&IEEEdouble);
assert (partCount()==1);
uint64_t myexponent, mysignificand;
if (category==fcNormal) {
myexponent = exponent+1023; //bias
mysignificand = *significandParts();
if (myexponent==1 && !(mysignificand & 0x10000000000000LL))
myexponent = 0; // denormal
} else if (category==fcZero) {
myexponent = 0;
mysignificand = 0;
} else if (category==fcInfinity) {
myexponent = 0x7ff;
mysignificand = 0;
} else {
assert(category == fcNaN && "Unknown category!");
myexponent = 0x7ff;
mysignificand = *significandParts();
}
return APInt(64, (((((uint64_t)sign & 1) << 63) |
((myexponent & 0x7ff) << 52) |
(mysignificand & 0xfffffffffffffLL))));
}
APInt
APFloat::convertFloatAPFloatToAPInt() const
{
assert(semantics == (const llvm::fltSemantics*)&IEEEsingle);
assert (partCount()==1);
uint32_t myexponent, mysignificand;
if (category==fcNormal) {
myexponent = exponent+127; //bias
mysignificand = *significandParts();
if (myexponent == 1 && !(mysignificand & 0x800000))
myexponent = 0; // denormal
} else if (category==fcZero) {
myexponent = 0;
mysignificand = 0;
} else if (category==fcInfinity) {
myexponent = 0xff;
mysignificand = 0;
} else {
assert(category == fcNaN && "Unknown category!");
myexponent = 0xff;
mysignificand = *significandParts();
}
return APInt(32, (((sign&1) << 31) | ((myexponent&0xff) << 23) |
(mysignificand & 0x7fffff)));
}
// This function creates an APInt that is just a bit map of the floating
// point constant as it would appear in memory. It is not a conversion,
// and treating the result as a normal integer is unlikely to be useful.
APInt
APFloat::convertToAPInt() const
{
if (semantics == (const llvm::fltSemantics* const)&IEEEsingle)
return convertFloatAPFloatToAPInt();
if (semantics == (const llvm::fltSemantics* const)&IEEEdouble)
return convertDoubleAPFloatToAPInt();
if (semantics == (const llvm::fltSemantics* const)&PPCDoubleDouble)
return convertPPCDoubleDoubleAPFloatToAPInt();
assert(semantics == (const llvm::fltSemantics* const)&x87DoubleExtended &&
"unknown format!");
return convertF80LongDoubleAPFloatToAPInt();
}
float
APFloat::convertToFloat() const
{
assert(semantics == (const llvm::fltSemantics* const)&IEEEsingle);
APInt api = convertToAPInt();
return api.bitsToFloat();
}
double
APFloat::convertToDouble() const
{
assert(semantics == (const llvm::fltSemantics* const)&IEEEdouble);
APInt api = convertToAPInt();
return api.bitsToDouble();
}
/// Integer bit is explicit in this format. Current Intel book does not
/// define meaning of:
/// exponent = all 1's, integer bit not set.
/// exponent = 0, integer bit set. (formerly "psuedodenormals")
/// exponent!=0 nor all 1's, integer bit not set. (formerly "unnormals")
void
APFloat::initFromF80LongDoubleAPInt(const APInt &api)
{
assert(api.getBitWidth()==80);
uint64_t i1 = api.getRawData()[0];
uint64_t i2 = api.getRawData()[1];
uint64_t myexponent = (i1 >> 48) & 0x7fff;
uint64_t mysignificand = ((i1 << 16) & 0xffffffffffff0000ULL) |
(i2 & 0xffff);
initialize(&APFloat::x87DoubleExtended);
assert(partCount()==2);
sign = i1>>63;
if (myexponent==0 && mysignificand==0) {
// exponent, significand meaningless
category = fcZero;
} else if (myexponent==0x7fff && mysignificand==0x8000000000000000ULL) {
// exponent, significand meaningless
category = fcInfinity;
} else if (myexponent==0x7fff && mysignificand!=0x8000000000000000ULL) {
// exponent meaningless
category = fcNaN;
significandParts()[0] = mysignificand;
significandParts()[1] = 0;
} else {
category = fcNormal;
exponent = myexponent - 16383;
significandParts()[0] = mysignificand;
significandParts()[1] = 0;
if (myexponent==0) // denormal
exponent = -16382;
}
}
void
APFloat::initFromPPCDoubleDoubleAPInt(const APInt &api)
{
assert(api.getBitWidth()==128);
uint64_t i1 = api.getRawData()[0];
uint64_t i2 = api.getRawData()[1];
uint64_t myexponent = (i1 >> 52) & 0x7ff;
uint64_t mysignificand = i1 & 0xfffffffffffffLL;
uint64_t myexponent2 = (i2 >> 52) & 0x7ff;
uint64_t mysignificand2 = i2 & 0xfffffffffffffLL;
initialize(&APFloat::PPCDoubleDouble);
assert(partCount()==2);
sign = i1>>63;
sign2 = i2>>63;
if (myexponent==0 && mysignificand==0) {
// exponent, significand meaningless
// exponent2 and significand2 are required to be 0; we don't check
category = fcZero;
} else if (myexponent==0x7ff && mysignificand==0) {
// exponent, significand meaningless
// exponent2 and significand2 are required to be 0; we don't check
category = fcInfinity;
} else if (myexponent==0x7ff && mysignificand!=0) {
// exponent meaningless. So is the whole second word, but keep it
// for determinism.
category = fcNaN;
exponent2 = myexponent2;
significandParts()[0] = mysignificand;
significandParts()[1] = mysignificand2;
} else {
category = fcNormal;
// Note there is no category2; the second word is treated as if it is
// fcNormal, although it might be something else considered by itself.
exponent = myexponent - 1023;
exponent2 = myexponent2 - 1023;
significandParts()[0] = mysignificand;
significandParts()[1] = mysignificand2;
if (myexponent==0) // denormal
exponent = -1022;
else
significandParts()[0] |= 0x10000000000000LL; // integer bit
if (myexponent2==0)
exponent2 = -1022;
else
significandParts()[1] |= 0x10000000000000LL; // integer bit
}
}
void
APFloat::initFromDoubleAPInt(const APInt &api)
{
assert(api.getBitWidth()==64);
uint64_t i = *api.getRawData();
uint64_t myexponent = (i >> 52) & 0x7ff;
uint64_t mysignificand = i & 0xfffffffffffffLL;
initialize(&APFloat::IEEEdouble);
assert(partCount()==1);
sign = i>>63;
if (myexponent==0 && mysignificand==0) {
// exponent, significand meaningless
category = fcZero;
} else if (myexponent==0x7ff && mysignificand==0) {
// exponent, significand meaningless
category = fcInfinity;
} else if (myexponent==0x7ff && mysignificand!=0) {
// exponent meaningless
category = fcNaN;
*significandParts() = mysignificand;
} else {
category = fcNormal;
exponent = myexponent - 1023;
*significandParts() = mysignificand;
if (myexponent==0) // denormal
exponent = -1022;
else
*significandParts() |= 0x10000000000000LL; // integer bit
}
}
void
APFloat::initFromFloatAPInt(const APInt & api)
{
assert(api.getBitWidth()==32);
uint32_t i = (uint32_t)*api.getRawData();
uint32_t myexponent = (i >> 23) & 0xff;
uint32_t mysignificand = i & 0x7fffff;
initialize(&APFloat::IEEEsingle);
assert(partCount()==1);
sign = i >> 31;
if (myexponent==0 && mysignificand==0) {
// exponent, significand meaningless
category = fcZero;
} else if (myexponent==0xff && mysignificand==0) {
// exponent, significand meaningless
category = fcInfinity;
} else if (myexponent==0xff && mysignificand!=0) {
// sign, exponent, significand meaningless
category = fcNaN;
*significandParts() = mysignificand;
} else {
category = fcNormal;
exponent = myexponent - 127; //bias
*significandParts() = mysignificand;
if (myexponent==0) // denormal
exponent = -126;
else
*significandParts() |= 0x800000; // integer bit
}
}
/// Treat api as containing the bits of a floating point number. Currently
/// we infer the floating point type from the size of the APInt. The
/// isIEEE argument distinguishes between PPC128 and IEEE128 (not meaningful
/// when the size is anything else).
void
APFloat::initFromAPInt(const APInt& api, bool isIEEE)
{
if (api.getBitWidth() == 32)
return initFromFloatAPInt(api);
else if (api.getBitWidth()==64)
return initFromDoubleAPInt(api);
else if (api.getBitWidth()==80)
return initFromF80LongDoubleAPInt(api);
else if (api.getBitWidth()==128 && !isIEEE)
return initFromPPCDoubleDoubleAPInt(api);
else
assert(0);
}
APFloat::APFloat(const APInt& api, bool isIEEE)
{
initFromAPInt(api, isIEEE);
}
APFloat::APFloat(float f)
{
APInt api = APInt(32, 0);
initFromAPInt(api.floatToBits(f));
}
APFloat::APFloat(double d)
{
APInt api = APInt(64, 0);
initFromAPInt(api.doubleToBits(d));
}