Abseil Common Libraries (C++) (grcp 依赖)
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427 lines
14 KiB
427 lines
14 KiB
7 years ago
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// Copyright 2018 The Abseil Authors.
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//
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// Licensed under the Apache License, Version 2.0 (the "License");
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// you may not use this file except in compliance with the License.
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// You may obtain a copy of the License at
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//
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// http://www.apache.org/licenses/LICENSE-2.0
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//
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// Unless required by applicable law or agreed to in writing, software
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// distributed under the License is distributed on an "AS IS" BASIS,
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// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
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// See the License for the specific language governing permissions and
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// limitations under the License.
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#ifndef ABSL_STRINGS_INTERNAL_CHARCONV_BIGINT_H_
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#define ABSL_STRINGS_INTERNAL_CHARCONV_BIGINT_H_
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#include <algorithm>
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#include <cstdint>
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#include <iostream>
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#include <string>
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#include "absl/strings/ascii.h"
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#include "absl/strings/internal/charconv_parse.h"
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#include "absl/strings/string_view.h"
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namespace absl {
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namespace strings_internal {
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// The largest power that 5 that can be raised to, and still fit in a uint32_t.
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constexpr int kMaxSmallPowerOfFive = 13;
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// The largest power that 10 that can be raised to, and still fit in a uint32_t.
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constexpr int kMaxSmallPowerOfTen = 9;
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extern const uint32_t kFiveToNth[kMaxSmallPowerOfFive + 1];
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extern const uint32_t kTenToNth[kMaxSmallPowerOfTen + 1];
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// Large, fixed-width unsigned integer.
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//
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// Exact rounding for decimal-to-binary floating point conversion requires very
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// large integer math, but a design goal of absl::from_chars is to avoid
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// allocating memory. The integer precision needed for decimal-to-binary
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// conversions is large but bounded, so a huge fixed-width integer class
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// suffices.
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//
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// This is an intentionally limited big integer class. Only needed operations
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// are implemented. All storage lives in an array data member, and all
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// arithmetic is done in-place, to avoid requiring separate storage for operand
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// and result.
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//
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// This is an internal class. Some methods live in the .cc file, and are
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// instantiated only for the values of max_words we need.
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template <int max_words>
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class BigUnsigned {
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public:
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static_assert(max_words == 4 || max_words == 84,
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"unsupported max_words value");
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BigUnsigned() : size_(0), words_{} {}
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explicit BigUnsigned(uint32_t v) : size_(v > 0 ? 1 : 0), words_{v} {}
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explicit BigUnsigned(uint64_t v)
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: size_(0),
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words_{static_cast<uint32_t>(v & 0xffffffff),
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static_cast<uint32_t>(v >> 32)} {
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if (words_[1]) {
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size_ = 2;
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} else if (words_[0]) {
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size_ = 1;
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}
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}
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// Constructs a BigUnsigned from the given string_view containing a decimal
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// value. If the input std::string is not a decimal integer, constructs a 0
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// instead.
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explicit BigUnsigned(absl::string_view sv) : size_(0), words_{} {
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// Check for valid input, returning a 0 otherwise. This is reasonable
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// behavior only because this constructor is for unit tests.
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if (std::find_if_not(sv.begin(), sv.end(), ascii_isdigit) != sv.end() ||
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sv.empty()) {
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return;
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}
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int exponent_adjust =
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ReadDigits(sv.data(), sv.data() + sv.size(), Digits10() + 1);
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if (exponent_adjust > 0) {
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MultiplyByTenToTheNth(exponent_adjust);
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}
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}
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// Loads the mantissa value of a previously-parsed float.
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//
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// Returns the associated decimal exponent. The value of the parsed float is
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// exactly *this * 10**exponent.
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int ReadFloatMantissa(const ParsedFloat& fp, int significant_digits);
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// Returns the number of decimal digits of precision this type provides. All
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// numbers with this many decimal digits or fewer are representable by this
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// type.
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//
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// Analagous to std::numeric_limits<BigUnsigned>::digits10.
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static constexpr int Digits10() {
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// 9975007/1035508 is very slightly less than log10(2**32).
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return static_cast<uint64_t>(max_words) * 9975007 / 1035508;
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}
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// Shifts left by the given number of bits.
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void ShiftLeft(int count) {
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if (count > 0) {
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const int word_shift = count / 32;
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if (word_shift >= max_words) {
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SetToZero();
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return;
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}
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size_ = std::min(size_ + word_shift, max_words);
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count %= 32;
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if (count == 0) {
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std::copy_backward(words_, words_ + size_ - word_shift, words_ + size_);
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} else {
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for (int i = std::min(size_, max_words - 1); i > word_shift; --i) {
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words_[i] = (words_[i - word_shift] << count) |
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(words_[i - word_shift - 1] >> (32 - count));
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}
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words_[word_shift] = words_[0] << count;
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// Grow size_ if necessary.
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if (size_ < max_words && words_[size_]) {
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++size_;
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}
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}
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std::fill(words_, words_ + word_shift, 0u);
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}
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}
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// Multiplies by v in-place.
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void MultiplyBy(uint32_t v) {
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if (size_ == 0 || v == 1) {
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return;
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}
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if (v == 0) {
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SetToZero();
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return;
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}
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const uint64_t factor = v;
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uint64_t window = 0;
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for (int i = 0; i < size_; ++i) {
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window += factor * words_[i];
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words_[i] = window & 0xffffffff;
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window >>= 32;
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}
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// If carry bits remain and there's space for them, grow size_.
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if (window && size_ < max_words) {
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words_[size_] = window & 0xffffffff;
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++size_;
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}
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}
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void MultiplyBy(uint64_t v) {
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uint32_t words[2];
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words[0] = static_cast<uint32_t>(v);
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words[1] = static_cast<uint32_t>(v >> 32);
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if (words[1] == 0) {
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MultiplyBy(words[0]);
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} else {
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MultiplyBy(2, words);
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}
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}
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// Multiplies in place by 5 to the power of n. n must be non-negative.
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void MultiplyByFiveToTheNth(int n) {
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while (n >= kMaxSmallPowerOfFive) {
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MultiplyBy(kFiveToNth[kMaxSmallPowerOfFive]);
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n -= kMaxSmallPowerOfFive;
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}
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if (n > 0) {
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MultiplyBy(kFiveToNth[n]);
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}
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}
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// Multiplies in place by 10 to the power of n. n must be non-negative.
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void MultiplyByTenToTheNth(int n) {
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if (n > kMaxSmallPowerOfTen) {
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// For large n, raise to a power of 5, then shift left by the same amount.
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// (10**n == 5**n * 2**n.) This requires fewer multiplications overall.
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MultiplyByFiveToTheNth(n);
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ShiftLeft(n);
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} else if (n > 0) {
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// We can do this more quickly for very small N by using a single
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// multiplication.
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MultiplyBy(kTenToNth[n]);
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}
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}
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// Returns the value of 5**n, for non-negative n. This implementation uses
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// a lookup table, and is faster then seeding a BigUnsigned with 1 and calling
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// MultiplyByFiveToTheNth().
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static BigUnsigned FiveToTheNth(int n);
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// Multiplies by another BigUnsigned, in-place.
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template <int M>
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void MultiplyBy(const BigUnsigned<M>& other) {
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MultiplyBy(other.size(), other.words());
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}
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void SetToZero() {
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std::fill(words_, words_ + size_, 0u);
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size_ = 0;
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}
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// Returns the value of the nth word of this BigUnsigned. This is
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// range-checked, and returns 0 on out-of-bounds accesses.
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uint32_t GetWord(int index) const {
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if (index < 0 || index >= size_) {
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return 0;
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}
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return words_[index];
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}
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// Returns this integer as a decimal std::string. This is not used in the decimal-
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// to-binary conversion; it is intended to aid in testing.
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std::string ToString() const;
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int size() const { return size_; }
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const uint32_t* words() const { return words_; }
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private:
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// Reads the number between [begin, end), possibly containing a decimal point,
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// into this BigUnsigned.
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//
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// Callers are required to ensure [begin, end) contains a valid number, with
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// one or more decimal digits and at most one decimal point. This routine
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// will behave unpredictably if these preconditions are not met.
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//
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// Only the first `significant_digits` digits are read. Digits beyond this
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// limit are "sticky": If the final significant digit is 0 or 5, and if any
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// dropped digit is nonzero, then that final significant digit is adjusted up
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// to 1 or 6. This adjustment allows for precise rounding.
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//
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// Returns `exponent_adjustment`, a power-of-ten exponent adjustment to
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// account for the decimal point and for dropped significant digits. After
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// this function returns,
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// actual_value_of_parsed_string ~= *this * 10**exponent_adjustment.
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int ReadDigits(const char* begin, const char* end, int significant_digits);
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// Performs a step of big integer multiplication. This computes the full
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// (64-bit-wide) values that should be added at the given index (step), and
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// adds to that location in-place.
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//
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// Because our math all occurs in place, we must multiply starting from the
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// highest word working downward. (This is a bit more expensive due to the
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// extra carries involved.)
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//
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// This must be called in steps, for each word to be calculated, starting from
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// the high end and working down to 0. The first value of `step` should be
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// `std::min(original_size + other.size_ - 2, max_words - 1)`.
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// The reason for this expression is that multiplying the i'th word from one
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// multiplicand and the j'th word of another multiplicand creates a
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// two-word-wide value to be stored at the (i+j)'th element. The highest
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// word indices we will access are `original_size - 1` from this object, and
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// `other.size_ - 1` from our operand. Therefore,
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// `original_size + other.size_ - 2` is the first step we should calculate,
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// but limited on an upper bound by max_words.
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// Working from high-to-low ensures that we do not overwrite the portions of
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// the initial value of *this which are still needed for later steps.
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//
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// Once called with step == 0, *this contains the result of the
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// multiplication.
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//
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// `original_size` is the size_ of *this before the first call to
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// MultiplyStep(). `other_words` and `other_size` are the contents of our
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// operand. `step` is the step to perform, as described above.
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void MultiplyStep(int original_size, const uint32_t* other_words,
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int other_size, int step);
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void MultiplyBy(int other_size, const uint32_t* other_words) {
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const int original_size = size_;
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const int first_step =
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std::min(original_size + other_size - 2, max_words - 1);
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for (int step = first_step; step >= 0; --step) {
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MultiplyStep(original_size, other_words, other_size, step);
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}
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}
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// Adds a 32-bit value to the index'th word, with carry.
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void AddWithCarry(int index, uint32_t value) {
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if (value) {
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while (index < max_words && value > 0) {
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words_[index] += value;
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// carry if we overflowed in this word:
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if (value > words_[index]) {
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value = 1;
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++index;
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} else {
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value = 0;
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}
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}
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size_ = std::min(max_words, std::max(index + 1, size_));
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}
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}
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void AddWithCarry(int index, uint64_t value) {
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if (value && index < max_words) {
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uint32_t high = value >> 32;
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uint32_t low = value & 0xffffffff;
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words_[index] += low;
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if (words_[index] < low) {
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++high;
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if (high == 0) {
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// Carry from the low word caused our high word to overflow.
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// Short circuit here to do the right thing.
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AddWithCarry(index + 2, static_cast<uint32_t>(1));
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return;
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}
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}
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if (high > 0) {
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AddWithCarry(index + 1, high);
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} else {
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// Normally 32-bit AddWithCarry() sets size_, but since we don't call
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// it when `high` is 0, do it ourselves here.
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size_ = std::min(max_words, std::max(index + 1, size_));
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}
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}
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}
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// Divide this in place by a constant divisor. Returns the remainder of the
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// division.
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template <uint32_t divisor>
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uint32_t DivMod() {
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uint64_t accumulator = 0;
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for (int i = size_ - 1; i >= 0; --i) {
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accumulator <<= 32;
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accumulator += words_[i];
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// accumulator / divisor will never overflow an int32_t in this loop
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words_[i] = static_cast<uint32_t>(accumulator / divisor);
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accumulator = accumulator % divisor;
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}
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while (size_ > 0 && words_[size_ - 1] == 0) {
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--size_;
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}
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return static_cast<uint32_t>(accumulator);
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}
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// The number of elements in words_ that may carry significant values.
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// All elements beyond this point are 0.
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//
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// When size_ is 0, this BigUnsigned stores the value 0.
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// When size_ is nonzero, is *not* guaranteed that words_[size_ - 1] is
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// nonzero. This can occur due to overflow truncation.
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// In particular, x.size_ != y.size_ does *not* imply x != y.
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int size_;
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uint32_t words_[max_words];
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};
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// Compares two big integer instances.
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//
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// Returns -1 if lhs < rhs, 0 if lhs == rhs, and 1 if lhs > rhs.
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template <int N, int M>
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int Compare(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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int limit = std::max(lhs.size(), rhs.size());
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for (int i = limit - 1; i >= 0; --i) {
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const uint32_t lhs_word = lhs.GetWord(i);
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const uint32_t rhs_word = rhs.GetWord(i);
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if (lhs_word < rhs_word) {
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return -1;
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} else if (lhs_word > rhs_word) {
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return 1;
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}
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}
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return 0;
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}
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template <int N, int M>
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bool operator==(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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int limit = std::max(lhs.size(), rhs.size());
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for (int i = 0; i < limit; ++i) {
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if (lhs.GetWord(i) != rhs.GetWord(i)) {
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return false;
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}
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}
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return true;
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}
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template <int N, int M>
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bool operator!=(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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return !(lhs == rhs);
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}
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template <int N, int M>
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bool operator<(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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return Compare(lhs, rhs) == -1;
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}
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template <int N, int M>
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bool operator>(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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return rhs < lhs;
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}
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template <int N, int M>
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bool operator<=(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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return !(rhs < lhs);
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}
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template <int N, int M>
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bool operator>=(const BigUnsigned<N>& lhs, const BigUnsigned<M>& rhs) {
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return !(lhs < rhs);
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}
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|
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|
// Output operator for BigUnsigned, for testing purposes only.
|
||
|
template <int N>
|
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|
std::ostream& operator<<(std::ostream& os, const BigUnsigned<N>& num) {
|
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|
return os << num.ToString();
|
||
|
}
|
||
|
|
||
|
// Explicit instantiation declarations for the sizes of BigUnsigned that we
|
||
|
// are using.
|
||
|
//
|
||
|
// For now, the choices of 4 and 84 are arbitrary; 4 is a small value that is
|
||
|
// still bigger than an int128, and 84 is a large value we will want to use
|
||
|
// in the from_chars implementation.
|
||
|
//
|
||
|
// Comments justifying the use of 84 belong in the from_chars implementation,
|
||
|
// and will be added in a follow-up CL.
|
||
|
extern template class BigUnsigned<4>;
|
||
|
extern template class BigUnsigned<84>;
|
||
|
|
||
|
} // namespace strings_internal
|
||
|
} // namespace absl
|
||
|
|
||
|
#endif // ABSL_STRINGS_INTERNAL_CHARCONV_BIGINT_H_
|