feefrac.h
1 // Copyright (c) The Bitcoin Core developers 2 // Distributed under the MIT software license, see the accompanying 3 // file COPYING or http://www.opensource.org/licenses/mit-license.php. 4 5 #ifndef BITCOIN_UTIL_FEEFRAC_H 6 #define BITCOIN_UTIL_FEEFRAC_H 7 8 #include <span.h> 9 #include <util/check.h> 10 11 #include <compare> 12 #include <cstdint> 13 #include <vector> 14 15 /** Data structure storing a fee and size, ordered by increasing fee/size. 16 * 17 * The size of a FeeFrac cannot be zero unless the fee is also zero. 18 * 19 * FeeFracs have a total ordering, first by increasing feerate (ratio of fee over size), and then 20 * by decreasing size. The empty FeeFrac (fee and size both 0) sorts last. So for example, the 21 * following FeeFracs are in sorted order: 22 * 23 * - fee=0 size=1 (feerate 0) 24 * - fee=1 size=2 (feerate 0.5) 25 * - fee=2 size=3 (feerate 0.667...) 26 * - fee=2 size=2 (feerate 1) 27 * - fee=1 size=1 (feerate 1) 28 * - fee=3 size=2 (feerate 1.5) 29 * - fee=2 size=1 (feerate 2) 30 * - fee=0 size=0 (undefined feerate) 31 * 32 * A FeeFrac is considered "better" if it sorts after another, by this ordering. All standard 33 * comparison operators (<=>, ==, !=, >, <, >=, <=) respect this ordering. 34 * 35 * The FeeRateCompare, and >> and << operators only compare feerate and treat equal feerate but 36 * different size as equivalent. The empty FeeFrac is neither lower or higher in feerate than any 37 * other. 38 */ 39 struct FeeFrac 40 { 41 /** Helper function for 32*64 signed multiplication, returning an unspecified but totally 42 * ordered type. This is a fallback version, separate so it can be tested on platforms where 43 * it isn't actually needed. */ 44 static inline std::pair<int64_t, uint32_t> MulFallback(int64_t a, int32_t b) noexcept 45 { 46 int64_t low = int64_t{static_cast<uint32_t>(a)} * b; 47 int64_t high = (a >> 32) * b; 48 return {high + (low >> 32), static_cast<uint32_t>(low)}; 49 } 50 51 /** Helper function for 96/32 signed division, rounding towards negative infinity (if 52 * round_down) or positive infinity (if !round_down). This is a fallback version, separate so 53 * that it can be tested on platforms where it isn't actually needed. 54 * 55 * The exact behavior with negative n does not really matter, but this implementation chooses 56 * to be consistent for testability reasons. 57 * 58 * The result must fit in an int64_t, and d must be strictly positive. */ 59 static inline int64_t DivFallback(std::pair<int64_t, uint32_t> n, int32_t d, bool round_down) noexcept 60 { 61 Assume(d > 0); 62 // Compute quot_high = n.first / d, so the result becomes 63 // (n.second + (n.first - quot_high * d) * 2**32) / d + (quot_high * 2**32), or 64 // (n.second + (n.first % d) * 2**32) / d + (quot_high * 2**32). 65 int64_t quot_high = n.first / d; 66 // Evaluate the parenthesized expression above, so the result becomes 67 // n_low / d + (quot_high * 2**32) 68 int64_t n_low = ((n.first % d) << 32) + n.second; 69 // Evaluate the division so the result becomes quot_low + quot_high * 2**32. It is possible 70 // that the / operator here rounds in the wrong direction (if n_low is not a multiple of 71 // size, and is (if round_down) negative, or (if !round_down) positive). If so, make a 72 // correction. 73 int64_t quot_low = n_low / d; 74 int32_t mod_low = n_low % d; 75 quot_low += (mod_low > 0) - (mod_low && round_down); 76 // Combine and return the result 77 return (quot_high << 32) + quot_low; 78 } 79 80 #ifdef __SIZEOF_INT128__ 81 /** Helper function for 32*64 signed multiplication, returning an unspecified but totally 82 * ordered type. This is a version relying on __int128. */ 83 static inline __int128 Mul(int64_t a, int32_t b) noexcept 84 { 85 return __int128{a} * b; 86 } 87 88 /** Helper function for 96/32 signed division, rounding towards negative infinity (if 89 * round_down), or towards positive infinity (if !round_down). This is a 90 * version relying on __int128. 91 * 92 * The result must fit in an int64_t, and d must be strictly positive. */ 93 static inline int64_t Div(__int128 n, int32_t d, bool round_down) noexcept 94 { 95 Assume(d > 0); 96 // Compute the division. 97 int64_t quot = n / d; 98 int32_t mod = n % d; 99 // Correct result if the / operator above rounded in the wrong direction. 100 return quot + ((mod > 0) - (mod && round_down)); 101 } 102 #else 103 static constexpr auto Mul = MulFallback; 104 static constexpr auto Div = DivFallback; 105 #endif 106 107 int64_t fee; 108 int32_t size; 109 110 /** Construct an IsEmpty() FeeFrac. */ 111 constexpr inline FeeFrac() noexcept : fee{0}, size{0} {} 112 113 /** Construct a FeeFrac with specified fee and size. */ 114 constexpr inline FeeFrac(int64_t f, int32_t s) noexcept : fee{f}, size{s} {} 115 116 constexpr inline FeeFrac(const FeeFrac&) noexcept = default; 117 constexpr inline FeeFrac& operator=(const FeeFrac&) noexcept = default; 118 119 /** Check if this is empty (size and fee are 0). */ 120 bool inline IsEmpty() const noexcept { 121 return size == 0; 122 } 123 124 /** Add fee and size of another FeeFrac to this one. */ 125 void inline operator+=(const FeeFrac& other) noexcept 126 { 127 fee += other.fee; 128 size += other.size; 129 } 130 131 /** Subtract fee and size of another FeeFrac from this one. */ 132 void inline operator-=(const FeeFrac& other) noexcept 133 { 134 fee -= other.fee; 135 size -= other.size; 136 } 137 138 /** Sum fee and size. */ 139 friend inline FeeFrac operator+(const FeeFrac& a, const FeeFrac& b) noexcept 140 { 141 return {a.fee + b.fee, a.size + b.size}; 142 } 143 144 /** Subtract both fee and size. */ 145 friend inline FeeFrac operator-(const FeeFrac& a, const FeeFrac& b) noexcept 146 { 147 return {a.fee - b.fee, a.size - b.size}; 148 } 149 150 /** Check if two FeeFrac objects are equal (both same fee and same size). */ 151 friend inline bool operator==(const FeeFrac& a, const FeeFrac& b) noexcept 152 { 153 return a.fee == b.fee && a.size == b.size; 154 } 155 156 /** Compare two FeeFracs just by feerate. */ 157 friend inline std::weak_ordering FeeRateCompare(const FeeFrac& a, const FeeFrac& b) noexcept 158 { 159 auto cross_a = Mul(a.fee, b.size), cross_b = Mul(b.fee, a.size); 160 return cross_a <=> cross_b; 161 } 162 163 /** Check if a FeeFrac object has strictly lower feerate than another. */ 164 friend inline bool operator<<(const FeeFrac& a, const FeeFrac& b) noexcept 165 { 166 auto cross_a = Mul(a.fee, b.size), cross_b = Mul(b.fee, a.size); 167 return cross_a < cross_b; 168 } 169 170 /** Check if a FeeFrac object has strictly higher feerate than another. */ 171 friend inline bool operator>>(const FeeFrac& a, const FeeFrac& b) noexcept 172 { 173 auto cross_a = Mul(a.fee, b.size), cross_b = Mul(b.fee, a.size); 174 return cross_a > cross_b; 175 } 176 177 /** Compare two FeeFracs. <, >, <=, and >= are auto-generated from this. */ 178 friend inline std::strong_ordering operator<=>(const FeeFrac& a, const FeeFrac& b) noexcept 179 { 180 auto cross_a = Mul(a.fee, b.size), cross_b = Mul(b.fee, a.size); 181 if (cross_a == cross_b) return b.size <=> a.size; 182 return cross_a <=> cross_b; 183 } 184 185 /** Swap two FeeFracs. */ 186 friend inline void swap(FeeFrac& a, FeeFrac& b) noexcept 187 { 188 std::swap(a.fee, b.fee); 189 std::swap(a.size, b.size); 190 } 191 192 /** Compute the fee for a given size `at_size` using this object's feerate. 193 * 194 * This effectively corresponds to evaluating (this->fee * at_size) / this->size, with the 195 * result rounded towards negative infinity (if RoundDown) or towards positive infinity 196 * (if !RoundDown). 197 * 198 * Requires this->size > 0, at_size >= 0, and that the correct result fits in a int64_t. This 199 * is guaranteed to be the case when 0 <= at_size <= this->size. 200 */ 201 template<bool RoundDown> 202 int64_t EvaluateFee(int32_t at_size) const noexcept 203 { 204 Assume(size > 0); 205 Assume(at_size >= 0); 206 if (fee >= 0 && fee < 0x200000000) [[likely]] { 207 // Common case where (this->fee * at_size) is guaranteed to fit in a uint64_t. 208 if constexpr (RoundDown) { 209 return (uint64_t(fee) * at_size) / uint32_t(size); 210 } else { 211 return (uint64_t(fee) * at_size + size - 1U) / uint32_t(size); 212 } 213 } else { 214 // Otherwise, use Mul and Div. 215 return Div(Mul(fee, at_size), size, RoundDown); 216 } 217 } 218 219 public: 220 /** Compute the fee for a given size `at_size` using this object's feerate, rounding down. */ 221 int64_t EvaluateFeeDown(int32_t at_size) const noexcept { return EvaluateFee<true>(at_size); } 222 /** Compute the fee for a given size `at_size` using this object's feerate, rounding up. */ 223 int64_t EvaluateFeeUp(int32_t at_size) const noexcept { return EvaluateFee<false>(at_size); } 224 }; 225 226 /** Compare the feerate diagrams implied by the provided sorted chunks data. 227 * 228 * The implied diagram for each starts at (0, 0), then contains for each chunk the cumulative fee 229 * and size up to that chunk, and then extends infinitely to the right with a horizontal line. 230 * 231 * The caller must guarantee that the sum of the FeeFracs in either of the chunks' data set do not 232 * overflow (so sum fees < 2^63, and sum sizes < 2^31). 233 */ 234 std::partial_ordering CompareChunks(std::span<const FeeFrac> chunks0, std::span<const FeeFrac> chunks1); 235 236 /** Tagged wrapper around FeeFrac to avoid unit confusion. */ 237 template<typename Tag> 238 struct FeePerUnit : public FeeFrac 239 { 240 // Inherit FeeFrac constructors. 241 using FeeFrac::FeeFrac; 242 243 /** Convert a FeeFrac to a FeePerUnit. */ 244 static FeePerUnit FromFeeFrac(const FeeFrac& feefrac) noexcept 245 { 246 return {feefrac.fee, feefrac.size}; 247 } 248 }; 249 250 // FeePerUnit instance for satoshi / vbyte. 251 struct VSizeTag {}; 252 using FeePerVSize = FeePerUnit<VSizeTag>; 253 254 // FeePerUnit instance for satoshi / WU. 255 struct WeightTag {}; 256 using FeePerWeight = FeePerUnit<WeightTag>; 257 258 #endif // BITCOIN_UTIL_FEEFRAC_H