mirror of
https://github.com/ClickHouse/ClickHouse.git
synced 2024-12-02 20:42:04 +00:00
556 lines
20 KiB
C++
556 lines
20 KiB
C++
// Copyright 2010 the V8 project authors. All rights reserved.
|
|
// Redistribution and use in source and binary forms, with or without
|
|
// modification, are permitted provided that the following conditions are
|
|
// met:
|
|
//
|
|
// * Redistributions of source code must retain the above copyright
|
|
// notice, this list of conditions and the following disclaimer.
|
|
// * Redistributions in binary form must reproduce the above
|
|
// copyright notice, this list of conditions and the following
|
|
// disclaimer in the documentation and/or other materials provided
|
|
// with the distribution.
|
|
// * Neither the name of Google Inc. nor the names of its
|
|
// contributors may be used to endorse or promote products derived
|
|
// from this software without specific prior written permission.
|
|
//
|
|
// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS
|
|
// "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT
|
|
// LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR
|
|
// A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT
|
|
// OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
|
|
// SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT
|
|
// LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
|
|
// DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
|
|
// THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
|
|
// (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
|
|
// OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
|
|
|
|
#include <stdarg.h>
|
|
#include <limits.h>
|
|
|
|
#include "strtod.h"
|
|
#include "bignum.h"
|
|
#include "cached-powers.h"
|
|
#include "ieee.h"
|
|
|
|
namespace double_conversion {
|
|
|
|
// 2^53 = 9007199254740992.
|
|
// Any integer with at most 15 decimal digits will hence fit into a double
|
|
// (which has a 53bit significand) without loss of precision.
|
|
static const int kMaxExactDoubleIntegerDecimalDigits = 15;
|
|
// 2^64 = 18446744073709551616 > 10^19
|
|
static const int kMaxUint64DecimalDigits = 19;
|
|
|
|
// Max double: 1.7976931348623157 x 10^308
|
|
// Min non-zero double: 4.9406564584124654 x 10^-324
|
|
// Any x >= 10^309 is interpreted as +infinity.
|
|
// Any x <= 10^-324 is interpreted as 0.
|
|
// Note that 2.5e-324 (despite being smaller than the min double) will be read
|
|
// as non-zero (equal to the min non-zero double).
|
|
static const int kMaxDecimalPower = 309;
|
|
static const int kMinDecimalPower = -324;
|
|
|
|
// 2^64 = 18446744073709551616
|
|
static const uint64_t kMaxUint64 = UINT64_2PART_C(0xFFFFFFFF, FFFFFFFF);
|
|
|
|
|
|
static const double exact_powers_of_ten[] = {
|
|
1.0, // 10^0
|
|
10.0,
|
|
100.0,
|
|
1000.0,
|
|
10000.0,
|
|
100000.0,
|
|
1000000.0,
|
|
10000000.0,
|
|
100000000.0,
|
|
1000000000.0,
|
|
10000000000.0, // 10^10
|
|
100000000000.0,
|
|
1000000000000.0,
|
|
10000000000000.0,
|
|
100000000000000.0,
|
|
1000000000000000.0,
|
|
10000000000000000.0,
|
|
100000000000000000.0,
|
|
1000000000000000000.0,
|
|
10000000000000000000.0,
|
|
100000000000000000000.0, // 10^20
|
|
1000000000000000000000.0,
|
|
// 10^22 = 0x21e19e0c9bab2400000 = 0x878678326eac9 * 2^22
|
|
10000000000000000000000.0
|
|
};
|
|
static const int kExactPowersOfTenSize = ARRAY_SIZE(exact_powers_of_ten);
|
|
|
|
// Maximum number of significant digits in the decimal representation.
|
|
// In fact the value is 772 (see conversions.cc), but to give us some margin
|
|
// we round up to 780.
|
|
static const int kMaxSignificantDecimalDigits = 780;
|
|
|
|
static Vector<const char> TrimLeadingZeros(Vector<const char> buffer) {
|
|
for (int i = 0; i < buffer.length(); i++) {
|
|
if (buffer[i] != '0') {
|
|
return buffer.SubVector(i, buffer.length());
|
|
}
|
|
}
|
|
return Vector<const char>(buffer.start(), 0);
|
|
}
|
|
|
|
|
|
static Vector<const char> TrimTrailingZeros(Vector<const char> buffer) {
|
|
for (int i = buffer.length() - 1; i >= 0; --i) {
|
|
if (buffer[i] != '0') {
|
|
return buffer.SubVector(0, i + 1);
|
|
}
|
|
}
|
|
return Vector<const char>(buffer.start(), 0);
|
|
}
|
|
|
|
|
|
static void CutToMaxSignificantDigits(Vector<const char> buffer,
|
|
int exponent,
|
|
char* significant_buffer,
|
|
int* significant_exponent) {
|
|
for (int i = 0; i < kMaxSignificantDecimalDigits - 1; ++i) {
|
|
significant_buffer[i] = buffer[i];
|
|
}
|
|
// The input buffer has been trimmed. Therefore the last digit must be
|
|
// different from '0'.
|
|
ASSERT(buffer[buffer.length() - 1] != '0');
|
|
// Set the last digit to be non-zero. This is sufficient to guarantee
|
|
// correct rounding.
|
|
significant_buffer[kMaxSignificantDecimalDigits - 1] = '1';
|
|
*significant_exponent =
|
|
exponent + (buffer.length() - kMaxSignificantDecimalDigits);
|
|
}
|
|
|
|
|
|
// Trims the buffer and cuts it to at most kMaxSignificantDecimalDigits.
|
|
// If possible the input-buffer is reused, but if the buffer needs to be
|
|
// modified (due to cutting), then the input needs to be copied into the
|
|
// buffer_copy_space.
|
|
static void TrimAndCut(Vector<const char> buffer, int exponent,
|
|
char* buffer_copy_space, int space_size,
|
|
Vector<const char>* trimmed, int* updated_exponent) {
|
|
Vector<const char> left_trimmed = TrimLeadingZeros(buffer);
|
|
Vector<const char> right_trimmed = TrimTrailingZeros(left_trimmed);
|
|
exponent += left_trimmed.length() - right_trimmed.length();
|
|
if (right_trimmed.length() > kMaxSignificantDecimalDigits) {
|
|
(void) space_size; // Mark variable as used.
|
|
ASSERT(space_size >= kMaxSignificantDecimalDigits);
|
|
CutToMaxSignificantDigits(right_trimmed, exponent,
|
|
buffer_copy_space, updated_exponent);
|
|
*trimmed = Vector<const char>(buffer_copy_space,
|
|
kMaxSignificantDecimalDigits);
|
|
} else {
|
|
*trimmed = right_trimmed;
|
|
*updated_exponent = exponent;
|
|
}
|
|
}
|
|
|
|
|
|
// Reads digits from the buffer and converts them to a uint64.
|
|
// Reads in as many digits as fit into a uint64.
|
|
// When the string starts with "1844674407370955161" no further digit is read.
|
|
// Since 2^64 = 18446744073709551616 it would still be possible read another
|
|
// digit if it was less or equal than 6, but this would complicate the code.
|
|
static uint64_t ReadUint64(Vector<const char> buffer,
|
|
int* number_of_read_digits) {
|
|
uint64_t result = 0;
|
|
int i = 0;
|
|
while (i < buffer.length() && result <= (kMaxUint64 / 10 - 1)) {
|
|
int digit = buffer[i++] - '0';
|
|
ASSERT(0 <= digit && digit <= 9);
|
|
result = 10 * result + digit;
|
|
}
|
|
*number_of_read_digits = i;
|
|
return result;
|
|
}
|
|
|
|
|
|
// Reads a DiyFp from the buffer.
|
|
// The returned DiyFp is not necessarily normalized.
|
|
// If remaining_decimals is zero then the returned DiyFp is accurate.
|
|
// Otherwise it has been rounded and has error of at most 1/2 ulp.
|
|
static void ReadDiyFp(Vector<const char> buffer,
|
|
DiyFp* result,
|
|
int* remaining_decimals) {
|
|
int read_digits;
|
|
uint64_t significand = ReadUint64(buffer, &read_digits);
|
|
if (buffer.length() == read_digits) {
|
|
*result = DiyFp(significand, 0);
|
|
*remaining_decimals = 0;
|
|
} else {
|
|
// Round the significand.
|
|
if (buffer[read_digits] >= '5') {
|
|
significand++;
|
|
}
|
|
// Compute the binary exponent.
|
|
int exponent = 0;
|
|
*result = DiyFp(significand, exponent);
|
|
*remaining_decimals = buffer.length() - read_digits;
|
|
}
|
|
}
|
|
|
|
|
|
static bool DoubleStrtod(Vector<const char> trimmed,
|
|
int exponent,
|
|
double* result) {
|
|
#if !defined(DOUBLE_CONVERSION_CORRECT_DOUBLE_OPERATIONS)
|
|
// On x86 the floating-point stack can be 64 or 80 bits wide. If it is
|
|
// 80 bits wide (as is the case on Linux) then double-rounding occurs and the
|
|
// result is not accurate.
|
|
// We know that Windows32 uses 64 bits and is therefore accurate.
|
|
// Note that the ARM simulator is compiled for 32bits. It therefore exhibits
|
|
// the same problem.
|
|
return false;
|
|
#endif
|
|
if (trimmed.length() <= kMaxExactDoubleIntegerDecimalDigits) {
|
|
int read_digits;
|
|
// The trimmed input fits into a double.
|
|
// If the 10^exponent (resp. 10^-exponent) fits into a double too then we
|
|
// can compute the result-double simply by multiplying (resp. dividing) the
|
|
// two numbers.
|
|
// This is possible because IEEE guarantees that floating-point operations
|
|
// return the best possible approximation.
|
|
if (exponent < 0 && -exponent < kExactPowersOfTenSize) {
|
|
// 10^-exponent fits into a double.
|
|
*result = static_cast<double>(ReadUint64(trimmed, &read_digits));
|
|
ASSERT(read_digits == trimmed.length());
|
|
*result /= exact_powers_of_ten[-exponent];
|
|
return true;
|
|
}
|
|
if (0 <= exponent && exponent < kExactPowersOfTenSize) {
|
|
// 10^exponent fits into a double.
|
|
*result = static_cast<double>(ReadUint64(trimmed, &read_digits));
|
|
ASSERT(read_digits == trimmed.length());
|
|
*result *= exact_powers_of_ten[exponent];
|
|
return true;
|
|
}
|
|
int remaining_digits =
|
|
kMaxExactDoubleIntegerDecimalDigits - trimmed.length();
|
|
if ((0 <= exponent) &&
|
|
(exponent - remaining_digits < kExactPowersOfTenSize)) {
|
|
// The trimmed string was short and we can multiply it with
|
|
// 10^remaining_digits. As a result the remaining exponent now fits
|
|
// into a double too.
|
|
*result = static_cast<double>(ReadUint64(trimmed, &read_digits));
|
|
ASSERT(read_digits == trimmed.length());
|
|
*result *= exact_powers_of_ten[remaining_digits];
|
|
*result *= exact_powers_of_ten[exponent - remaining_digits];
|
|
return true;
|
|
}
|
|
}
|
|
return false;
|
|
}
|
|
|
|
|
|
// Returns 10^exponent as an exact DiyFp.
|
|
// The given exponent must be in the range [1; kDecimalExponentDistance[.
|
|
static DiyFp AdjustmentPowerOfTen(int exponent) {
|
|
ASSERT(0 < exponent);
|
|
ASSERT(exponent < PowersOfTenCache::kDecimalExponentDistance);
|
|
// Simply hardcode the remaining powers for the given decimal exponent
|
|
// distance.
|
|
ASSERT(PowersOfTenCache::kDecimalExponentDistance == 8);
|
|
switch (exponent) {
|
|
case 1: return DiyFp(UINT64_2PART_C(0xa0000000, 00000000), -60);
|
|
case 2: return DiyFp(UINT64_2PART_C(0xc8000000, 00000000), -57);
|
|
case 3: return DiyFp(UINT64_2PART_C(0xfa000000, 00000000), -54);
|
|
case 4: return DiyFp(UINT64_2PART_C(0x9c400000, 00000000), -50);
|
|
case 5: return DiyFp(UINT64_2PART_C(0xc3500000, 00000000), -47);
|
|
case 6: return DiyFp(UINT64_2PART_C(0xf4240000, 00000000), -44);
|
|
case 7: return DiyFp(UINT64_2PART_C(0x98968000, 00000000), -40);
|
|
default:
|
|
UNREACHABLE();
|
|
}
|
|
}
|
|
|
|
|
|
// If the function returns true then the result is the correct double.
|
|
// Otherwise it is either the correct double or the double that is just below
|
|
// the correct double.
|
|
static bool DiyFpStrtod(Vector<const char> buffer,
|
|
int exponent,
|
|
double* result) {
|
|
DiyFp input;
|
|
int remaining_decimals;
|
|
ReadDiyFp(buffer, &input, &remaining_decimals);
|
|
// Since we may have dropped some digits the input is not accurate.
|
|
// If remaining_decimals is different than 0 than the error is at most
|
|
// .5 ulp (unit in the last place).
|
|
// We don't want to deal with fractions and therefore keep a common
|
|
// denominator.
|
|
const int kDenominatorLog = 3;
|
|
const int kDenominator = 1 << kDenominatorLog;
|
|
// Move the remaining decimals into the exponent.
|
|
exponent += remaining_decimals;
|
|
uint64_t error = (remaining_decimals == 0 ? 0 : kDenominator / 2);
|
|
|
|
int old_e = input.e();
|
|
input.Normalize();
|
|
error <<= old_e - input.e();
|
|
|
|
ASSERT(exponent <= PowersOfTenCache::kMaxDecimalExponent);
|
|
if (exponent < PowersOfTenCache::kMinDecimalExponent) {
|
|
*result = 0.0;
|
|
return true;
|
|
}
|
|
DiyFp cached_power;
|
|
int cached_decimal_exponent;
|
|
PowersOfTenCache::GetCachedPowerForDecimalExponent(exponent,
|
|
&cached_power,
|
|
&cached_decimal_exponent);
|
|
|
|
if (cached_decimal_exponent != exponent) {
|
|
int adjustment_exponent = exponent - cached_decimal_exponent;
|
|
DiyFp adjustment_power = AdjustmentPowerOfTen(adjustment_exponent);
|
|
input.Multiply(adjustment_power);
|
|
if (kMaxUint64DecimalDigits - buffer.length() >= adjustment_exponent) {
|
|
// The product of input with the adjustment power fits into a 64 bit
|
|
// integer.
|
|
ASSERT(DiyFp::kSignificandSize == 64);
|
|
} else {
|
|
// The adjustment power is exact. There is hence only an error of 0.5.
|
|
error += kDenominator / 2;
|
|
}
|
|
}
|
|
|
|
input.Multiply(cached_power);
|
|
// The error introduced by a multiplication of a*b equals
|
|
// error_a + error_b + error_a*error_b/2^64 + 0.5
|
|
// Substituting a with 'input' and b with 'cached_power' we have
|
|
// error_b = 0.5 (all cached powers have an error of less than 0.5 ulp),
|
|
// error_ab = 0 or 1 / kDenominator > error_a*error_b/ 2^64
|
|
int error_b = kDenominator / 2;
|
|
int error_ab = (error == 0 ? 0 : 1); // We round up to 1.
|
|
int fixed_error = kDenominator / 2;
|
|
error += error_b + error_ab + fixed_error;
|
|
|
|
old_e = input.e();
|
|
input.Normalize();
|
|
error <<= old_e - input.e();
|
|
|
|
// See if the double's significand changes if we add/subtract the error.
|
|
int order_of_magnitude = DiyFp::kSignificandSize + input.e();
|
|
int effective_significand_size =
|
|
Double::SignificandSizeForOrderOfMagnitude(order_of_magnitude);
|
|
int precision_digits_count =
|
|
DiyFp::kSignificandSize - effective_significand_size;
|
|
if (precision_digits_count + kDenominatorLog >= DiyFp::kSignificandSize) {
|
|
// This can only happen for very small denormals. In this case the
|
|
// half-way multiplied by the denominator exceeds the range of an uint64.
|
|
// Simply shift everything to the right.
|
|
int shift_amount = (precision_digits_count + kDenominatorLog) -
|
|
DiyFp::kSignificandSize + 1;
|
|
input.set_f(input.f() >> shift_amount);
|
|
input.set_e(input.e() + shift_amount);
|
|
// We add 1 for the lost precision of error, and kDenominator for
|
|
// the lost precision of input.f().
|
|
error = (error >> shift_amount) + 1 + kDenominator;
|
|
precision_digits_count -= shift_amount;
|
|
}
|
|
// We use uint64_ts now. This only works if the DiyFp uses uint64_ts too.
|
|
ASSERT(DiyFp::kSignificandSize == 64);
|
|
ASSERT(precision_digits_count < 64);
|
|
uint64_t one64 = 1;
|
|
uint64_t precision_bits_mask = (one64 << precision_digits_count) - 1;
|
|
uint64_t precision_bits = input.f() & precision_bits_mask;
|
|
uint64_t half_way = one64 << (precision_digits_count - 1);
|
|
precision_bits *= kDenominator;
|
|
half_way *= kDenominator;
|
|
DiyFp rounded_input(input.f() >> precision_digits_count,
|
|
input.e() + precision_digits_count);
|
|
if (precision_bits >= half_way + error) {
|
|
rounded_input.set_f(rounded_input.f() + 1);
|
|
}
|
|
// If the last_bits are too close to the half-way case than we are too
|
|
// inaccurate and round down. In this case we return false so that we can
|
|
// fall back to a more precise algorithm.
|
|
|
|
*result = Double(rounded_input).value();
|
|
if (half_way - error < precision_bits && precision_bits < half_way + error) {
|
|
// Too imprecise. The caller will have to fall back to a slower version.
|
|
// However the returned number is guaranteed to be either the correct
|
|
// double, or the next-lower double.
|
|
return false;
|
|
} else {
|
|
return true;
|
|
}
|
|
}
|
|
|
|
|
|
// Returns
|
|
// - -1 if buffer*10^exponent < diy_fp.
|
|
// - 0 if buffer*10^exponent == diy_fp.
|
|
// - +1 if buffer*10^exponent > diy_fp.
|
|
// Preconditions:
|
|
// buffer.length() + exponent <= kMaxDecimalPower + 1
|
|
// buffer.length() + exponent > kMinDecimalPower
|
|
// buffer.length() <= kMaxDecimalSignificantDigits
|
|
static int CompareBufferWithDiyFp(Vector<const char> buffer,
|
|
int exponent,
|
|
DiyFp diy_fp) {
|
|
ASSERT(buffer.length() + exponent <= kMaxDecimalPower + 1);
|
|
ASSERT(buffer.length() + exponent > kMinDecimalPower);
|
|
ASSERT(buffer.length() <= kMaxSignificantDecimalDigits);
|
|
// Make sure that the Bignum will be able to hold all our numbers.
|
|
// Our Bignum implementation has a separate field for exponents. Shifts will
|
|
// consume at most one bigit (< 64 bits).
|
|
// ln(10) == 3.3219...
|
|
ASSERT(((kMaxDecimalPower + 1) * 333 / 100) < Bignum::kMaxSignificantBits);
|
|
Bignum buffer_bignum;
|
|
Bignum diy_fp_bignum;
|
|
buffer_bignum.AssignDecimalString(buffer);
|
|
diy_fp_bignum.AssignUInt64(diy_fp.f());
|
|
if (exponent >= 0) {
|
|
buffer_bignum.MultiplyByPowerOfTen(exponent);
|
|
} else {
|
|
diy_fp_bignum.MultiplyByPowerOfTen(-exponent);
|
|
}
|
|
if (diy_fp.e() > 0) {
|
|
diy_fp_bignum.ShiftLeft(diy_fp.e());
|
|
} else {
|
|
buffer_bignum.ShiftLeft(-diy_fp.e());
|
|
}
|
|
return Bignum::Compare(buffer_bignum, diy_fp_bignum);
|
|
}
|
|
|
|
|
|
// Returns true if the guess is the correct double.
|
|
// Returns false, when guess is either correct or the next-lower double.
|
|
static bool ComputeGuess(Vector<const char> trimmed, int exponent,
|
|
double* guess) {
|
|
if (trimmed.length() == 0) {
|
|
*guess = 0.0;
|
|
return true;
|
|
}
|
|
if (exponent + trimmed.length() - 1 >= kMaxDecimalPower) {
|
|
*guess = Double::Infinity();
|
|
return true;
|
|
}
|
|
if (exponent + trimmed.length() <= kMinDecimalPower) {
|
|
*guess = 0.0;
|
|
return true;
|
|
}
|
|
|
|
if (DoubleStrtod(trimmed, exponent, guess) ||
|
|
DiyFpStrtod(trimmed, exponent, guess)) {
|
|
return true;
|
|
}
|
|
if (*guess == Double::Infinity()) {
|
|
return true;
|
|
}
|
|
return false;
|
|
}
|
|
|
|
double Strtod(Vector<const char> buffer, int exponent) {
|
|
char copy_buffer[kMaxSignificantDecimalDigits];
|
|
Vector<const char> trimmed;
|
|
int updated_exponent;
|
|
TrimAndCut(buffer, exponent, copy_buffer, kMaxSignificantDecimalDigits,
|
|
&trimmed, &updated_exponent);
|
|
exponent = updated_exponent;
|
|
|
|
double guess;
|
|
bool is_correct = ComputeGuess(trimmed, exponent, &guess);
|
|
if (is_correct) return guess;
|
|
|
|
DiyFp upper_boundary = Double(guess).UpperBoundary();
|
|
int comparison = CompareBufferWithDiyFp(trimmed, exponent, upper_boundary);
|
|
if (comparison < 0) {
|
|
return guess;
|
|
} else if (comparison > 0) {
|
|
return Double(guess).NextDouble();
|
|
} else if ((Double(guess).Significand() & 1) == 0) {
|
|
// Round towards even.
|
|
return guess;
|
|
} else {
|
|
return Double(guess).NextDouble();
|
|
}
|
|
}
|
|
|
|
float Strtof(Vector<const char> buffer, int exponent) {
|
|
char copy_buffer[kMaxSignificantDecimalDigits];
|
|
Vector<const char> trimmed;
|
|
int updated_exponent;
|
|
TrimAndCut(buffer, exponent, copy_buffer, kMaxSignificantDecimalDigits,
|
|
&trimmed, &updated_exponent);
|
|
exponent = updated_exponent;
|
|
|
|
double double_guess;
|
|
bool is_correct = ComputeGuess(trimmed, exponent, &double_guess);
|
|
|
|
float float_guess = static_cast<float>(double_guess);
|
|
if (float_guess == double_guess) {
|
|
// This shortcut triggers for integer values.
|
|
return float_guess;
|
|
}
|
|
|
|
// We must catch double-rounding. Say the double has been rounded up, and is
|
|
// now a boundary of a float, and rounds up again. This is why we have to
|
|
// look at previous too.
|
|
// Example (in decimal numbers):
|
|
// input: 12349
|
|
// high-precision (4 digits): 1235
|
|
// low-precision (3 digits):
|
|
// when read from input: 123
|
|
// when rounded from high precision: 124.
|
|
// To do this we simply look at the neigbors of the correct result and see
|
|
// if they would round to the same float. If the guess is not correct we have
|
|
// to look at four values (since two different doubles could be the correct
|
|
// double).
|
|
|
|
double double_next = Double(double_guess).NextDouble();
|
|
double double_previous = Double(double_guess).PreviousDouble();
|
|
|
|
float f1 = static_cast<float>(double_previous);
|
|
float f2 = float_guess;
|
|
float f3 = static_cast<float>(double_next);
|
|
float f4;
|
|
if (is_correct) {
|
|
f4 = f3;
|
|
} else {
|
|
double double_next2 = Double(double_next).NextDouble();
|
|
f4 = static_cast<float>(double_next2);
|
|
}
|
|
(void) f2; // Mark variable as used.
|
|
ASSERT(f1 <= f2 && f2 <= f3 && f3 <= f4);
|
|
|
|
// If the guess doesn't lie near a single-precision boundary we can simply
|
|
// return its float-value.
|
|
if (f1 == f4) {
|
|
return float_guess;
|
|
}
|
|
|
|
ASSERT((f1 != f2 && f2 == f3 && f3 == f4) ||
|
|
(f1 == f2 && f2 != f3 && f3 == f4) ||
|
|
(f1 == f2 && f2 == f3 && f3 != f4));
|
|
|
|
// guess and next are the two possible canditates (in the same way that
|
|
// double_guess was the lower candidate for a double-precision guess).
|
|
float guess = f1;
|
|
float next = f4;
|
|
DiyFp upper_boundary;
|
|
if (guess == 0.0f) {
|
|
float min_float = 1e-45f;
|
|
upper_boundary = Double(static_cast<double>(min_float) / 2).AsDiyFp();
|
|
} else {
|
|
upper_boundary = Single(guess).UpperBoundary();
|
|
}
|
|
int comparison = CompareBufferWithDiyFp(trimmed, exponent, upper_boundary);
|
|
if (comparison < 0) {
|
|
return guess;
|
|
} else if (comparison > 0) {
|
|
return next;
|
|
} else if ((Single(guess).Significand() & 1) == 0) {
|
|
// Round towards even.
|
|
return guess;
|
|
} else {
|
|
return next;
|
|
}
|
|
}
|
|
|
|
} // namespace double_conversion
|