mirror of
https://github.com/LadybirdBrowser/ladybird.git
synced 2024-11-11 01:06:01 +03:00
6124050187
Instead of using the specified type U like we want, we were using the type T all along when comparing with smaller integers. This is now fixed.
778 lines
21 KiB
C++
778 lines
21 KiB
C++
/*
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* Copyright (c) 2021, Leon Albrecht <leon2002.la@gmail.com>
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*
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* SPDX-License-Identifier: BSD-2-Clause
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*/
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#pragma once
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#include <AK/BuiltinWrappers.h>
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#include <AK/Checked.h>
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#include <AK/Concepts.h>
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#include <AK/Format.h>
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#include <AK/NumericLimits.h>
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#include <AK/StdLibExtraDetails.h>
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#include <AK/StdLibExtras.h>
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#include <AK/String.h>
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#include <AK/StringBuilder.h>
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namespace AK {
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template<typename T>
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requires(sizeof(T) >= sizeof(u64) && IsUnsigned<T>) class UFixedBigInt;
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// FIXME: This breaks formatting
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// template<typename T>
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// constexpr inline bool Detail::IsIntegral<UFixedBigInt<T>> = true;
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template<typename T>
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constexpr inline bool Detail::IsUnsigned<UFixedBigInt<T>> = true;
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template<typename T>
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constexpr inline bool Detail::IsSigned<UFixedBigInt<T>> = false;
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template<typename T>
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struct NumericLimits<UFixedBigInt<T>> {
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static constexpr UFixedBigInt<T> min() { return 0; }
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static constexpr UFixedBigInt<T> max() { return { NumericLimits<T>::max(), NumericLimits<T>::max() }; }
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static constexpr bool is_signed() { return false; }
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};
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template<typename T>
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requires(sizeof(T) >= sizeof(u64) && IsUnsigned<T>) class UFixedBigInt {
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public:
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using R = UFixedBigInt<T>;
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constexpr UFixedBigInt() = default;
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr UFixedBigInt(U low)
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: m_low(low)
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, m_high(0u)
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{
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}
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template<Unsigned U, Unsigned U2>
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requires(sizeof(T) >= sizeof(U) && sizeof(T) >= sizeof(U2)) constexpr UFixedBigInt(U low, U2 high)
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: m_low(low)
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, m_high(high)
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{
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}
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constexpr T& low()
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{
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return m_low;
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}
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constexpr const T& low() const
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{
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return m_low;
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}
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constexpr T& high()
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{
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return m_high;
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}
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constexpr const T& high() const
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{
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return m_high;
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}
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Span<u8> bytes()
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{
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return Span<u8>(reinterpret_cast<u8*>(this), sizeof(R));
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}
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Span<const u8> bytes() const
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{
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return Span<const u8>(reinterpret_cast<const u8*>(this), sizeof(R));
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) explicit operator U() const
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{
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return static_cast<U>(m_low);
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}
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// Utils
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constexpr size_t clz() const requires(IsSame<T, u64>)
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{
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if (m_high)
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return count_leading_zeroes(m_high);
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else
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return sizeof(T) * 8 + count_leading_zeroes(m_low);
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}
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constexpr size_t clz() const requires(!IsSame<T, u64>)
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{
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if (m_high)
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return m_high.clz();
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else
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return sizeof(T) * 8 + m_low.clz();
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}
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constexpr size_t ctz() const requires(IsSame<T, u64>)
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{
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if (m_low)
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return count_trailing_zeroes(m_low);
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else
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return sizeof(T) * 8 + count_trailing_zeroes(m_high);
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}
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constexpr size_t ctz() const requires(!IsSame<T, u64>)
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{
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if (m_low)
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return m_low.ctz();
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else
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return sizeof(T) * 8 + m_high.ctz();
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}
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constexpr size_t popcnt() const requires(IsSame<T, u64>)
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{
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return __builtin_popcntll(m_low) + __builtin_popcntll(m_high);
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}
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constexpr size_t popcnt() const requires(!IsSame<T, u64>)
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{
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return m_low.popcnt() + m_high.popcnt();
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}
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// Comparison Operations
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constexpr bool operator!() const
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{
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return !m_low && !m_high;
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}
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constexpr explicit operator bool() const
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{
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return m_low || m_high;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator==(const U& other) const
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{
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return !m_high && m_low == other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator!=(const U& other) const
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{
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return m_high || m_low != other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator>(const U& other) const
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{
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return m_high || m_low > other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator<(const U& other) const
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{
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return !m_high && m_low < other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator>=(const U& other) const
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{
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return *this == other || *this > other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr bool operator<=(const U& other) const
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{
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return *this == other || *this < other;
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}
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constexpr bool operator==(const R& other) const
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{
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return m_low == other.low() && m_high == other.high();
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}
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constexpr bool operator!=(const R& other) const
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{
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return m_low != other.low() || m_high != other.high();
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}
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constexpr bool operator>(const R& other) const
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{
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return m_high > other.high()
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|| (m_high == other.high() && m_low > other.low());
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}
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constexpr bool operator<(const R& other) const
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{
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return m_high < other.high()
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|| (m_high == other.high() && m_low < other.low());
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}
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constexpr bool operator>=(const R& other) const
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{
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return *this == other || *this > other;
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}
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constexpr bool operator<=(const R& other) const
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{
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return *this == other || *this < other;
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}
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// Bitwise operations
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constexpr R operator~() const
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{
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return { ~m_low, ~m_high };
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr U operator&(const U& other) const
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{
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return static_cast<const U>(m_low) & other;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R operator|(const U& other) const
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{
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return { m_low | other, m_high };
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R operator^(const U& other) const
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{
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return { m_low ^ other, m_high };
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}
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template<Unsigned U>
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constexpr R operator<<(const U& shift) const
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{
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if (shift >= sizeof(R) * 8u)
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return 0u;
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if (shift >= sizeof(T) * 8u)
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return R { 0u, m_low << (shift - sizeof(T) * 8u) };
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if (!shift)
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return *this;
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T overflow = m_low >> (sizeof(T) * 8u - shift);
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return R { m_low << shift, (m_high << shift) | overflow };
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}
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template<Unsigned U>
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constexpr R operator>>(const U& shift) const
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{
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if (shift >= sizeof(R) * 8u)
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return 0u;
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if (shift >= sizeof(T) * 8u)
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return m_high >> (shift - sizeof(T) * 8u);
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if (!shift)
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return *this;
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T underflow = m_high << (sizeof(T) * 8u - shift);
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return R { (m_low >> shift) | underflow, m_high >> shift };
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}
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template<Unsigned U>
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constexpr R rol(const U& shift) const
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{
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return (*this >> sizeof(T) * 8u - shift) | (*this << shift);
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}
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template<Unsigned U>
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constexpr R ror(const U& shift) const
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{
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return (*this << sizeof(T) * 8u - shift) | (*this >> shift);
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}
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constexpr R operator&(const R& other) const
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{
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return { m_low & other.low(), m_high & other.high() };
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}
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constexpr R operator|(const R& other) const
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{
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return { m_low | other.low(), m_high | other.high() };
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}
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constexpr R operator^(const R& other) const
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{
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return { m_low ^ other.low(), m_high ^ other.high() };
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}
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// Bitwise assignment
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R& operator&=(const U& other)
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{
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m_high = 0u;
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m_low &= other;
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return *this;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R& operator|=(const U& other)
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{
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m_low |= other;
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return *this;
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}
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R& operator^=(const U& other)
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{
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m_low ^= other;
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return *this;
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}
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template<Unsigned U>
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constexpr R& operator>>=(const U& other)
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{
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*this = *this >> other;
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return *this;
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}
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template<Unsigned U>
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constexpr R& operator<<=(const U& other)
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{
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*this = *this << other;
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return *this;
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}
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constexpr R& operator&=(const R& other)
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{
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m_high &= other.high();
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m_low &= other.low();
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return *this;
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}
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constexpr R& operator|=(const R& other)
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{
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m_high |= other.high();
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m_low |= other.low();
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return *this;
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}
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constexpr R& operator^=(const R& other)
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{
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m_high ^= other.high();
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m_low ^= other.low();
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return *this;
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}
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static constexpr size_t my_size()
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{
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return sizeof(R);
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}
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// Arithmetic
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// implies size of less than u64, so passing references isn't useful
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U) && IsSame<T, u64>) constexpr R addc(const U other, bool& carry) const
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{
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bool low_carry = Checked<T>::addition_would_overflow(m_low, other);
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low_carry |= Checked<T>::addition_would_overflow(m_low, carry);
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bool high_carry = Checked<T>::addition_would_overflow(m_high, low_carry);
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T lower = m_low + other + carry;
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T higher = m_high + low_carry;
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carry = high_carry;
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return {
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lower,
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higher
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};
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}
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template<Unsigned U>
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requires(my_size() > sizeof(U) && sizeof(T) > sizeof(u64)) constexpr R addc(const U& other, bool& carry) const
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{
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T lower = m_low.addc(other, carry);
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T higher = m_high.addc(0u, carry);
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return {
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lower,
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higher
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};
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}
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template<Unsigned U>
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requires(IsSame<R, U>&& IsSame<T, u64>) constexpr R addc(const U& other, bool& carry) const
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{
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bool low_carry = Checked<T>::addition_would_overflow(m_low, other.low());
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bool high_carry = Checked<T>::addition_would_overflow(m_high, other.high());
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T lower = m_low + other.low();
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T higher = m_high + other.high();
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low_carry |= Checked<T>::addition_would_overflow(lower, carry);
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high_carry |= Checked<T>::addition_would_overflow(higher, low_carry);
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lower += carry;
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higher += low_carry;
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carry = high_carry;
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return {
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lower,
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higher
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};
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}
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template<Unsigned U>
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requires(IsSame<R, U> && sizeof(T) > sizeof(u64)) constexpr R addc(const U& other, bool& carry) const
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{
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T lower = m_low.addc(other.low(), carry);
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T higher = m_high.addc(other.high(), carry);
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return {
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lower,
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higher
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};
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}
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template<Unsigned U>
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requires(my_size() < sizeof(U)) constexpr U addc(const U& other, bool& carry) const
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{
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return other.addc(*this, carry);
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}
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// FIXME: subc for sizeof(T) < sizeof(U)
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template<Unsigned U>
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requires(sizeof(T) >= sizeof(U)) constexpr R subc(const U& other, bool& carry) const
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{
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bool low_carry = (!m_low && carry) || (m_low - carry) < other;
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bool high_carry = !m_high && low_carry;
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T lower = m_low - other - carry;
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T higher = m_high - low_carry;
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carry = high_carry;
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return { lower, higher };
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}
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constexpr R subc(const R& other, bool& carry) const
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{
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bool low_carry = (!m_low && carry) || (m_low - carry) < other.low();
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bool high_carry = (!m_high && low_carry) || (m_high - low_carry) < other.high();
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T lower = m_low - other.low() - carry;
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T higher = m_high - other.high() - low_carry;
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carry = high_carry;
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return { lower, higher };
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}
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constexpr R operator+(const bool& other) const
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{
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bool carry = false; // unused
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return addc((u8)other, carry);
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}
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template<Unsigned U>
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constexpr R operator+(const U& other) const
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{
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bool carry = false; // unused
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return addc(other, carry);
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}
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constexpr R operator-(const bool& other) const
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{
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bool carry = false; // unused
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return subc((u8)other, carry);
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}
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template<Unsigned U>
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constexpr R operator-(const U& other) const
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{
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bool carry = false; // unused
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return subc(other, carry);
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}
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template<Unsigned U>
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constexpr R& operator+=(const U& other)
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{
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*this = *this + other;
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return *this;
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}
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template<Unsigned U>
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constexpr R& operator-=(const U& other)
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{
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*this = *this - other;
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return *this;
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}
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constexpr R operator++()
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{
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// x++
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auto old = *this;
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*this += 1;
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return old;
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}
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constexpr R& operator++(int)
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{
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// ++x
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*this += 1;
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return *this;
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}
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constexpr R operator--()
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{
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// x--
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auto old = *this;
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*this -= 1;
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return old;
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}
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constexpr R& operator--(int)
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{
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// --x
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*this -= 1;
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return *this;
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}
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// FIXME: no restraints on this
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template<Unsigned U>
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requires(my_size() >= sizeof(U)) constexpr R div_mod(const U& divisor, U& remainder) const
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{
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// FIXME: Is there a better way to raise a division by 0?
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// Maybe as a compiletime warning?
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#pragma GCC diagnostic push
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#pragma GCC diagnostic ignored "-Wdiv-by-zero"
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if (!divisor) {
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volatile int x = 1;
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volatile int y = 0;
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[[maybe_unused]] volatile int z = x / y;
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}
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#pragma GCC diagnostic pop
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// fastpaths
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if (*this < divisor) {
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remainder = static_cast<U>(*this);
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return 0u;
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}
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if (*this == divisor) {
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remainder = 0u;
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return 1u;
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}
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if (divisor == 1u) {
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remainder = 0u;
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return *this;
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}
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remainder = 0u;
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R quotient = 0u;
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for (ssize_t i = sizeof(R) * 8 - clz() - 1; i >= 0; --i) {
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remainder <<= 1u;
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remainder |= (*this >> (size_t)i) & 1u;
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if (remainder >= divisor) {
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remainder -= divisor;
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quotient |= R { 1u } << (size_t)i;
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}
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}
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return quotient;
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}
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template<Unsigned U>
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constexpr R operator*(U other) const
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{
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R res = 0u;
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R that = *this;
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for (; other != 0u; other >>= 1u) {
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if (other & 1u)
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res += that;
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that <<= 1u;
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}
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return res;
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}
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template<Unsigned U>
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constexpr R operator/(const U& other) const
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{
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U mod { 0u }; // unused
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return div_mod(other, mod);
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}
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template<Unsigned U>
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constexpr U operator%(const U& other) const
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{
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|
R res { 0u };
|
|
div_mod(other, res);
|
|
return res;
|
|
}
|
|
|
|
template<Unsigned U>
|
|
constexpr R& operator*=(const U& other)
|
|
{
|
|
*this = *this * other;
|
|
return *this;
|
|
}
|
|
template<Unsigned U>
|
|
constexpr R& operator/=(const U& other)
|
|
{
|
|
*this = *this / other;
|
|
return *this;
|
|
}
|
|
template<Unsigned U>
|
|
constexpr R& operator%=(const U& other)
|
|
{
|
|
*this = *this % other;
|
|
return *this;
|
|
}
|
|
|
|
constexpr R sqrt() const
|
|
{
|
|
// Bitwise method: https://en.wikipedia.org/wiki/Integer_square_root#Using_bitwise_operations
|
|
// the bitwise method seems to be way faster then Newtons:
|
|
// https://quick-bench.com/q/eXZwW1DVhZxLE0llumeCXkfOK3Q
|
|
if (*this == 1u)
|
|
return 1u;
|
|
|
|
ssize_t shift = (sizeof(R) * 8 - clz()) & ~1ULL;
|
|
// should be equivalent to:
|
|
// long shift = 2;
|
|
// while ((val >> shift) != 0)
|
|
// shift += 2;
|
|
|
|
R res = 0u;
|
|
while (shift >= 0) {
|
|
res = res << 1u;
|
|
R large_cand = (res | 1u);
|
|
if (*this >> (size_t)shift >= large_cand * large_cand)
|
|
res = large_cand;
|
|
shift -= 2;
|
|
}
|
|
return res;
|
|
}
|
|
|
|
constexpr R pow(u64 exp)
|
|
{
|
|
// Montgomery's Ladder Technique
|
|
// https://en.wikipedia.org/wiki/Exponentiation_by_squaring#Montgomery's_ladder_technique
|
|
R x1 = *this;
|
|
R x2 = *this * *this;
|
|
u64 exp_copy = exp;
|
|
for (ssize_t i = sizeof(u64) * 8 - count_leading_zeroes(exp) - 2; i >= 0; --i) {
|
|
if (exp_copy & 1u) {
|
|
x2 *= x1;
|
|
x1 *= x1;
|
|
} else {
|
|
x1 *= x2;
|
|
x2 *= x2;
|
|
}
|
|
exp_copy >>= 1u;
|
|
}
|
|
return x1;
|
|
}
|
|
template<Unsigned U>
|
|
requires(sizeof(U) > sizeof(u64)) constexpr R pow(U exp)
|
|
{
|
|
// Montgomery's Ladder Technique
|
|
// https://en.wikipedia.org/wiki/Exponentiation_by_squaring#Montgomery's_ladder_technique
|
|
R x1 = *this;
|
|
R x2 = *this * *this;
|
|
U exp_copy = exp;
|
|
for (ssize_t i = sizeof(U) * 8 - exp().clz() - 2; i >= 0; --i) {
|
|
if (exp_copy & 1u) {
|
|
x2 *= x1;
|
|
x1 *= x1;
|
|
} else {
|
|
x1 *= x2;
|
|
x2 *= x2;
|
|
}
|
|
exp_copy >>= 1u;
|
|
}
|
|
return x1;
|
|
}
|
|
|
|
template<Unsigned U>
|
|
constexpr U pow_mod(u64 exp, U mod)
|
|
{
|
|
// Left to right binary method:
|
|
// https://en.wikipedia.org/wiki/Modular_exponentiation#Left-to-right_binary_method
|
|
// FIXME: this is not sidechanel proof
|
|
if (!mod)
|
|
return 0u;
|
|
|
|
U res = 1;
|
|
u64 exp_copy = exp;
|
|
for (size_t i = sizeof(u64) - count_leading_zeroes(exp) - 1u; i < exp; ++i) {
|
|
res *= res;
|
|
res %= mod;
|
|
if (exp_copy & 1u) {
|
|
res = (*this * res) % mod;
|
|
}
|
|
exp_copy >>= 1u;
|
|
}
|
|
return res;
|
|
}
|
|
template<Unsigned ExpT, Unsigned U>
|
|
requires(sizeof(ExpT) > sizeof(u64)) constexpr U pow_mod(ExpT exp, U mod)
|
|
{
|
|
// Left to right binary method:
|
|
// https://en.wikipedia.org/wiki/Modular_exponentiation#Left-to-right_binary_method
|
|
// FIXME: this is not side channel proof
|
|
if (!mod)
|
|
return 0u;
|
|
|
|
U res = 1;
|
|
ExpT exp_copy = exp;
|
|
for (size_t i = sizeof(ExpT) - exp.clz() - 1u; i < exp; ++i) {
|
|
res *= res;
|
|
res %= mod;
|
|
if (exp_copy & 1u) {
|
|
res = (*this * res) % mod;
|
|
}
|
|
exp_copy >>= 1u;
|
|
}
|
|
return res;
|
|
}
|
|
|
|
constexpr size_t log2()
|
|
{
|
|
// FIXME: proper rounding
|
|
return sizeof(R) - clz();
|
|
}
|
|
constexpr size_t logn(u64 base)
|
|
{
|
|
// FIXME: proper rounding
|
|
return log2() / (sizeof(u64) - count_leading_zeroes(base));
|
|
}
|
|
template<Unsigned U>
|
|
requires(sizeof(U) > sizeof(u64)) constexpr size_t logn(U base)
|
|
{
|
|
// FIXME: proper rounding
|
|
return log2() / base.log2();
|
|
}
|
|
|
|
private:
|
|
T m_low;
|
|
T m_high;
|
|
};
|
|
|
|
// reverse operators
|
|
template<Unsigned U, Unsigned T>
|
|
requires(sizeof(U) < sizeof(T) * 2) constexpr bool operator<(const U a, const UFixedBigInt<T>& b) { return b >= a; }
|
|
template<Unsigned U, Unsigned T>
|
|
requires(sizeof(U) < sizeof(T) * 2) constexpr bool operator>(const U a, const UFixedBigInt<T>& b) { return b <= a; }
|
|
template<Unsigned U, Unsigned T>
|
|
requires(sizeof(U) < sizeof(T) * 2) constexpr bool operator<=(const U a, const UFixedBigInt<T>& b) { return b > a; }
|
|
template<Unsigned U, Unsigned T>
|
|
requires(sizeof(U) < sizeof(T) * 2) constexpr bool operator>=(const U a, const UFixedBigInt<T>& b) { return b < a; }
|
|
|
|
template<Unsigned T>
|
|
struct Formatter<UFixedBigInt<T>> : StandardFormatter {
|
|
Formatter() = default;
|
|
explicit Formatter(StandardFormatter formatter)
|
|
: StandardFormatter(formatter)
|
|
{
|
|
}
|
|
|
|
ErrorOr<void> format(FormatBuilder& builder, UFixedBigInt<T> value)
|
|
{
|
|
if (m_precision.has_value())
|
|
VERIFY_NOT_REACHED();
|
|
|
|
if (m_mode == Mode::Pointer) {
|
|
// these are way to big for a pointer
|
|
VERIFY_NOT_REACHED();
|
|
}
|
|
if (m_mode == Mode::Default)
|
|
m_mode = Mode::Hexadecimal;
|
|
|
|
if (!value.high()) {
|
|
Formatter<T> formatter { *this };
|
|
return formatter.format(builder, value.low());
|
|
}
|
|
|
|
u8 base = 0;
|
|
if (m_mode == Mode::Binary) {
|
|
base = 2;
|
|
} else if (m_mode == Mode::BinaryUppercase) {
|
|
base = 2;
|
|
} else if (m_mode == Mode::Octal) {
|
|
TODO();
|
|
} else if (m_mode == Mode::Decimal) {
|
|
TODO();
|
|
} else if (m_mode == Mode::Hexadecimal) {
|
|
base = 16;
|
|
} else if (m_mode == Mode::HexadecimalUppercase) {
|
|
base = 16;
|
|
} else {
|
|
VERIFY_NOT_REACHED();
|
|
}
|
|
ssize_t width = m_width.value_or(0);
|
|
ssize_t lower_length = ceil_div(sizeof(T) * 8, (ssize_t)base);
|
|
Formatter<T> formatter { *this };
|
|
formatter.m_width = max(width - lower_length, (ssize_t)0);
|
|
TRY(formatter.format(builder, value.high()));
|
|
TRY(builder.put_literal("'"sv));
|
|
formatter.m_zero_pad = true;
|
|
formatter.m_alternative_form = false;
|
|
formatter.m_width = lower_length;
|
|
TRY(formatter.format(builder, value.low()));
|
|
return {};
|
|
}
|
|
};
|
|
}
|
|
|
|
// Nit: Doing these as custom classes might be faster, especially when writing
|
|
// then in SSE, but this would cause a lot of Code duplication and due to
|
|
// the nature of constexprs and the intelligence of the compiler they might
|
|
// be using SSE/MMX either way
|
|
|
|
// these sizes should suffice for most usecases
|
|
using u128 = AK::UFixedBigInt<u64>;
|
|
using u256 = AK::UFixedBigInt<u128>;
|
|
using u512 = AK::UFixedBigInt<u256>;
|
|
using u1024 = AK::UFixedBigInt<u512>;
|
|
using u2048 = AK::UFixedBigInt<u1024>;
|
|
using u4096 = AK::UFixedBigInt<u2048>;
|