// Copyright 2018 The Abseil Authors.
//
// Licensed under the Apache License, Version 2.0 (the "License");
// you may not use this file except in compliance with the License.
// You may obtain a copy of the License at
//
// https://www.apache.org/licenses/LICENSE-2.0
//
// Unless required by applicable law or agreed to in writing, software
// distributed under the License is distributed on an "AS IS" BASIS,
// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
// See the License for the specific language governing permissions and
// limitations under the License.
#include "absl/strings/internal/charconv_parse.h"
#include "absl/strings/charconv.h"
#include <cassert>
#include <cstdint>
#include <limits>
#include "absl/strings/internal/memutil.h"
namespace absl {
ABSL_NAMESPACE_BEGIN
namespace {
// ParseFloat<10> will read the first 19 significant digits of the mantissa.
// This number was chosen for multiple reasons.
//
// (a) First, for whatever integer type we choose to represent the mantissa, we
// want to choose the largest possible number of decimal digits for that integer
// type. We are using uint64_t, which can express any 19-digit unsigned
// integer.
//
// (b) Second, we need to parse enough digits that the binary value of any
// mantissa we capture has more bits of resolution than the mantissa
// representation in the target float. Our algorithm requires at least 3 bits
// of headway, but 19 decimal digits give a little more than that.
//
// The following static assertions verify the above comments:
constexpr int kDecimalMantissaDigitsMax = 19;
static_assert(std::numeric_limits<uint64_t>::digits10 ==
kDecimalMantissaDigitsMax,
"(a) above");
// IEEE doubles, which we assume in Abseil, have 53 binary bits of mantissa.
static_assert(std::numeric_limits<double>::is_iec559, "IEEE double assumed");
static_assert(std::numeric_limits<double>::radix == 2, "IEEE double fact");
static_assert(std::numeric_limits<double>::digits == 53, "IEEE double fact");
// The lowest valued 19-digit decimal mantissa we can read still contains
// sufficient information to reconstruct a binary mantissa.
static_assert(1000000000000000000u > (uint64_t(1) << (53 + 3)), "(b) above");
// ParseFloat<16> will read the first 15 significant digits of the mantissa.
//
// Because a base-16-to-base-2 conversion can be done exactly, we do not need
// to maximize the number of scanned hex digits to improve our conversion. What
// is required is to scan two more bits than the mantissa can represent, so that
// we always round correctly.
//
// (One extra bit does not suffice to perform correct rounding, since a number
// exactly halfway between two representable floats has unique rounding rules,
// so we need to differentiate between a "halfway between" number and a "closer
// to the larger value" number.)
constexpr int kHexadecimalMantissaDigitsMax = 15;
// The minimum number of significant bits that will be read from
// kHexadecimalMantissaDigitsMax hex digits. We must subtract by three, since
// the most significant digit can be a "1", which only contributes a single
// significant bit.
constexpr int kGuaranteedHexadecimalMantissaBitPrecision =
4 * kHexadecimalMantissaDigitsMax - 3;
static_assert(kGuaranteedHexadecimalMantissaBitPrecision >
std::numeric_limits<double>::digits + 2,
"kHexadecimalMantissaDigitsMax too small");
// We also impose a limit on the number of significant digits we will read from
// an exponent, to avoid having to deal with integer overflow. We use 9 for
// this purpose.
//
// If we read a 9 digit exponent, the end result of the conversion will
// necessarily be infinity or zero, depending on the sign of the exponent.
// Therefore we can just drop extra digits on the floor without any extra
// logic.
constexpr int kDecimalExponentDigitsMax = 9;
static_assert(std::numeric_limits<int>::digits10 >= kDecimalExponentDigitsMax,
"int type too small");
// To avoid incredibly large inputs causing integer overflow for our exponent,
// we impose an arbitrary but very large limit on the number of significant
// digits we will accept. The implementation refuses to match a string with
// more consecutive significant mantissa digits than this.
constexpr int kDecimalDigitLimit = 50000000;
// Corresponding limit for hexadecimal digit inputs. This is one fourth the
// amount of kDecimalDigitLimit, since each dropped hexadecimal digit requires
// a binary exponent adjustment of 4.
constexpr int kHexadecimalDigitLimit = kDecimalDigitLimit / 4;
// The largest exponent we can read is 999999999 (per
// kDecimalExponentDigitsMax), and the largest exponent adjustment we can get
// from dropped mantissa digits is 2 * kDecimalDigitLimit, and the sum of these
// comfortably fits in an integer.
//
// We count kDecimalDigitLimit twice because there are independent limits for
// numbers before and after the decimal point. (In the case where there are no
// significant digits before the decimal point, there are independent limits for
// post-decimal-point leading zeroes and for significant digits.)
static_assert(999999999 + 2 * kDecimalDigitLimit <
std::numeric_limits<int>::max(),
"int type too small");
static_assert(999999999 + 2 * (4 * kHexadecimalDigitLimit) <
std::numeric_limits<int>::max(),
"int type too small");
// Returns true if the provided bitfield allows parsing an exponent value
// (e.g., "1.5e100").
bool AllowExponent(chars_format flags) {
bool fixed = (flags & chars_format::fixed) == chars_format::fixed;
bool scientific =
(flags & chars_format::scientific) == chars_format::scientific;
return scientific || !fixed;
}
// Returns true if the provided bitfield requires an exponent value be present.
bool RequireExponent(chars_format flags) {
bool fixed = (flags & chars_format::fixed) == chars_format::fixed;
bool scientific =
(flags & chars_format::scientific) == chars_format::scientific;
return scientific && !fixed;
}
const int8_t kAsciiToInt[256] = {
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 0, 1, 2, 3, 4, 5, 6, 7, 8,
9, -1, -1, -1, -1, -1, -1, -1, 10, 11, 12, 13, 14, 15, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, 10, 11, 12, 13, 14, 15, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1,
-1, -1, -1, -1, -1, -1, -1, -1, -1};
// Returns true if `ch` is a digit in the given base
template <int base>
bool IsDigit(char ch);
// Converts a valid `ch` to its digit value in the given base.
template <int base>
unsigned ToDigit(char ch);
// Returns true if `ch` is the exponent delimiter for the given base.
template <int base>
bool IsExponentCharacter(char ch);
// Returns the maximum number of significant digits we will read for a float
// in the given base.
template <int base>
constexpr int MantissaDigitsMax();
// Returns the largest consecutive run of digits we will accept when parsing a
// number in the given base.
template <int base>
constexpr int DigitLimit();
// Returns the amount the exponent must be adjusted by for each dropped digit.
// (For decimal this is 1, since the digits are in base 10 and the exponent base
// is also 10, but for hexadecimal this is 4, since the digits are base 16 but
// the exponent base is 2.)
template <int base>
constexpr int DigitMagnitude();
template <>
bool IsDigit<10>(char ch) {
return ch >= '0' && ch <= '9';
}
template <>
bool IsDigit<16>(char ch) {
return kAsciiToInt[static_cast<unsigned char>(ch)] >= 0;
}
template <>
unsigned ToDigit<10>(char ch) {
return ch - '0';
}
template <>
unsigned ToDigit<16>(char ch) {
return kAsciiToInt[static_cast<unsigned char>(ch)];
}
template <>
bool IsExponentCharacter<10>(char ch) {
return ch == 'e' || ch == 'E';
}
template <>
bool IsExponentCharacter<16>(char ch) {
return ch == 'p' || ch == 'P';
}
template <>
constexpr int MantissaDigitsMax<10>() {
return kDecimalMantissaDigitsMax;
}
template <>
constexpr int MantissaDigitsMax<16>() {
return kHexadecimalMantissaDigitsMax;
}
template <>
constexpr int DigitLimit<10>() {
return kDecimalDigitLimit;
}
template <>
constexpr int DigitLimit<16>() {
return kHexadecimalDigitLimit;
}
template <>
constexpr int DigitMagnitude<10>() {
return 1;
}
template <>
constexpr int DigitMagnitude<16>() {
return 4;
}
// Reads decimal digits from [begin, end) into *out. Returns the number of
// digits consumed.
//
// After max_digits has been read, keeps consuming characters, but no longer
// adjusts *out. If a nonzero digit is dropped this way, *dropped_nonzero_digit
// is set; otherwise, it is left unmodified.
//
// If no digits are matched, returns 0 and leaves *out unchanged.
//
// ConsumeDigits does not protect against overflow on *out; max_digits must
// be chosen with respect to type T to avoid the possibility of overflow.
template <int base, typename T>
int ConsumeDigits(const char* begin, const char* end, int max_digits, T* out,
bool* dropped_nonzero_digit) {
if (base == 10) {
assert(max_digits <= std::numeric_limits<T>::digits10);
} else if (base == 16) {
assert(max_digits * 4 <= std::numeric_limits<T>::digits);
}
const char* const original_begin = begin;
// Skip leading zeros, but only if *out is zero.
// They don't cause an overflow so we don't have to count them for
// `max_digits`.
while (!*out && end != begin && *begin == '0') ++begin;
T accumulator = *out;
const char* significant_digits_end =
(end - begin > max_digits) ? begin + max_digits : end;
while (begin < significant_digits_end && IsDigit<base>(*begin)) {
// Do not guard against *out overflow; max_digits was chosen to avoid this.
// Do assert against it, to detect problems in debug builds.
auto digit = static_cast<T>(ToDigit<base>(*begin));
assert(accumulator * base >= accumulator);
accumulator *= base;
assert(accumulator + digit >= accumulator);
accumulator += digit;
++begin;
}
bool dropped_nonzero = false;
while (begin < end && IsDigit<base>(*begin)) {
dropped_nonzero = dropped_nonzero || (*begin != '0');
++begin;
}
if (dropped_nonzero && dropped_nonzero_digit != nullptr) {
*dropped_nonzero_digit = true;
}
*out = accumulator;
return static_cast<int>(begin - original_begin);
}
// Returns true if `v` is one of the chars allowed inside parentheses following
// a NaN.
bool IsNanChar(char v) {
return (v == '_') || (v >= '0' && v <= '9') || (v >= 'a' && v <= 'z') ||
(v >= 'A' && v <= 'Z');
}
// Checks the range [begin, end) for a strtod()-formatted infinity or NaN. If
// one is found, sets `out` appropriately and returns true.
bool ParseInfinityOrNan(const char* begin, const char* end,
strings_internal::ParsedFloat* out) {
if (end - begin < 3) {
return false;
}
switch (*begin) {
case 'i':
case 'I': {
// An infinity string consists of the characters "inf" or "infinity",
// case insensitive.
if (strings_internal::memcasecmp(begin + 1, "nf", 2) != 0) {
return false;
}
out->type = strings_internal::FloatType::kInfinity;
if (end - begin >= 8 &&
strings_internal::memcasecmp(begin + 3, "inity", 5) == 0) {
out->end = begin + 8;
} else {
out->end = begin + 3;
}
return true;
}
case 'n':
case 'N': {
// A NaN consists of the characters "nan", case insensitive, optionally
// followed by a parenthesized sequence of zero or more alphanumeric
// characters and/or underscores.
if (strings_internal::memcasecmp(begin + 1, "an", 2) != 0) {
return false;
}
out->type = strings_internal::FloatType::kNan;
out->end = begin + 3;
// NaN is allowed to be followed by a parenthesized string, consisting of
// only the characters [a-zA-Z0-9_]. Match that if it's present.
begin += 3;
if (begin < end && *begin == '(') {
const char* nan_begin = begin + 1;
while (nan_begin < end && IsNanChar(*nan_begin)) {
++nan_begin;
}
if (nan_begin < end && *nan_begin == ')') {
// We found an extra NaN specifier range
out->subrange_begin = begin + 1;
out->subrange_end = nan_begin;
out->end = nan_begin + 1;
}
}
return true;
}
default:
return false;
}
}
} // namespace
namespace strings_internal {
template <int base>
strings_internal::ParsedFloat ParseFloat(const char* begin, const char* end,
chars_format format_flags) {
strings_internal::ParsedFloat result;
// Exit early if we're given an empty range.
if (begin == end) return result;
// Handle the infinity and NaN cases.
if (ParseInfinityOrNan(begin, end, &result)) {
return result;
}
const char* const mantissa_begin = begin;
while (begin < end && *begin == '0') {
++begin; // skip leading zeros
}
uint64_t mantissa = 0;
int exponent_adjustment = 0;
bool mantissa_is_inexact = false;
int pre_decimal_digits = ConsumeDigits<base>(
begin, end, MantissaDigitsMax<base>(), &mantissa, &mantissa_is_inexact);
begin += pre_decimal_digits;
int digits_left;
if (pre_decimal_digits >= DigitLimit<base>()) {
// refuse to parse pathological inputs
return result;
} else if (pre_decimal_digits > MantissaDigitsMax<base>()) {
// We dropped some non-fraction digits on the floor. Adjust our exponent
// to compensate.
exponent_adjustment =
static_cast<int>(pre_decimal_digits - MantissaDigitsMax<base>());
digits_left = 0;
} else {
digits_left =
static_cast<int>(MantissaDigitsMax<base>() - pre_decimal_digits);
}
if (begin < end && *begin == '.') {
++begin;
if (mantissa == 0) {
// If we haven't seen any nonzero digits yet, keep skipping zeros. We
// have to adjust the exponent to reflect the changed place value.
const char* begin_zeros = begin;
while (begin < end && *begin == '0') {
++begin;
}
int zeros_skipped = static_cast<int>(begin - begin_zeros);
if (zeros_skipped >= DigitLimit<base>()) {
// refuse to parse pathological inputs
return result;
}
exponent_adjustment -= static_cast<int>(zeros_skipped);
}
int post_decimal_digits = ConsumeDigits<base>(
begin, end, digits_left, &mantissa, &mantissa_is_inexact);
begin += post_decimal_digits;
// Since `mantissa` is an integer, each significant digit we read after
// the decimal point requires an adjustment to the exponent. "1.23e0" will
// be stored as `mantissa` == 123 and `exponent` == -2 (that is,
// "123e-2").
if (post_decimal_digits >= DigitLimit<base>()) {
// refuse to parse pathological inputs
return result;
} else if (post_decimal_digits > digits_left) {
exponent_adjustment -= digits_left;
} else {
exponent_adjustment -= post_decimal_digits;
}
}
// If we've found no mantissa whatsoever, this isn't a number.
if (mantissa_begin == begin) {
return result;
}
// A bare "." doesn't count as a mantissa either.
if (begin - mantissa_begin == 1 && *mantissa_begin == '.') {
return result;
}
if (mantissa_is_inexact) {
// We dropped significant digits on the floor. Handle this appropriately.
if (base == 10) {
// If we truncated significant decimal digits, store the full range of the
// mantissa for future big integer math for exact rounding.
result.subrange_begin = mantissa_begin;
result.subrange_end = begin;
} else if (base == 16) {
// If we truncated hex digits, reflect this fact by setting the low
// ("sticky") bit. This allows for correct rounding in all cases.
mantissa |= 1;
}
}
result.mantissa = mantissa;
const char* const exponent_begin = begin;
result.literal_exponent = 0;
bool found_exponent = false;
if (AllowExponent(format_flags) && begin < end &&
IsExponentCharacter<base>(*begin)) {
bool negative_exponent = false;
++begin;
if (begin < end && *begin == '-') {
negative_exponent = true;
++begin;
} else if (begin < end && *begin == '+') {
++begin;
}
const char* const exponent_digits_begin = begin;
// Exponent is always expressed in decimal, even for hexadecimal floats.
begin += ConsumeDigits<10>(begin, end, kDecimalExponentDigitsMax,
&result.literal_exponent, nullptr);
if (begin == exponent_digits_begin) {
// there were no digits where we expected an exponent. We failed to read
// an exponent and should not consume the 'e' after all. Rewind 'begin'.
found_exponent = false;
begin = exponent_begin;
} else {
found_exponent = true;
if (negative_exponent) {
result.literal_exponent = -result.literal_exponent;
}
}
}
if (!found_exponent && RequireExponent(format_flags)) {
// Provided flags required an exponent, but none was found. This results
// in a failure to scan.
return result;
}
// Success!
result.type = strings_internal::FloatType::kNumber;
if (result.mantissa > 0) {
result.exponent = result.literal_exponent +
(DigitMagnitude<base>() * exponent_adjustment);
} else {
result.exponent = 0;
}
result.end = begin;
return result;
}
template ParsedFloat ParseFloat<10>(const char* begin, const char* end,
chars_format format_flags);
template ParsedFloat ParseFloat<16>(const char* begin, const char* end,
chars_format format_flags);
} // namespace strings_internal
ABSL_NAMESPACE_END
} // namespace absl