| //===-- Utilities to convert floating point values to string ----*- C++ -*-===// |
| // |
| // Part of the LLVM Project, under the Apache License v2.0 with LLVM Exceptions. |
| // See https://llvm.org/LICENSE.txt for license information. |
| // SPDX-License-Identifier: Apache-2.0 WITH LLVM-exception |
| // |
| //===----------------------------------------------------------------------===// |
| |
| #ifndef LLVM_LIBC_SRC___SUPPORT_FLOAT_TO_STRING_H |
| #define LLVM_LIBC_SRC___SUPPORT_FLOAT_TO_STRING_H |
| |
| #include <stdint.h> |
| |
| #include "src/__support/CPP/limits.h" |
| #include "src/__support/CPP/type_traits.h" |
| #include "src/__support/FPUtil/FPBits.h" |
| #include "src/__support/FPUtil/dyadic_float.h" |
| #include "src/__support/big_int.h" |
| #include "src/__support/common.h" |
| #include "src/__support/libc_assert.h" |
| #include "src/__support/macros/attributes.h" |
| |
| // This file has 5 compile-time flags to allow the user to configure the float |
| // to string behavior. These were used to explore tradeoffs during the design |
| // phase, and can still be used to gain specific properties. Unless you |
| // specifically know what you're doing, you should leave all these flags off. |
| |
| // LIBC_COPT_FLOAT_TO_STR_NO_SPECIALIZE_LD |
| // This flag disables the separate long double conversion implementation. It is |
| // not based on the Ryu algorithm, instead generating the digits by |
| // multiplying/dividing the written-out number by 10^9 to get blocks. It's |
| // significantly faster than INT_CALC, only about 10x slower than MEGA_TABLE, |
| // and is small in binary size. Its downside is that it always calculates all |
| // of the digits above the decimal point, making it inefficient for %e calls |
| // with large exponents. This specialization overrides other flags, so this |
| // flag must be set for other flags to effect the long double behavior. |
| |
| // LIBC_COPT_FLOAT_TO_STR_USE_MEGA_LONG_DOUBLE_TABLE |
| // The Mega Table is ~5 megabytes when compiled. It lists the constants needed |
| // to perform the Ryu Printf algorithm (described below) for all long double |
| // values. This makes it extremely fast for both doubles and long doubles, in |
| // exchange for large binary size. |
| |
| // LIBC_COPT_FLOAT_TO_STR_USE_DYADIC_FLOAT |
| // Dyadic floats are software floating point numbers, and their accuracy can be |
| // as high as necessary. This option uses 256 bit dyadic floats to calculate |
| // the table values that Ryu Printf needs. This is reasonably fast and very |
| // small compared to the Mega Table, but the 256 bit floats only give accurate |
| // results for the first ~50 digits of the output. In practice this shouldn't |
| // be a problem since long doubles are only accurate for ~35 digits, but the |
| // trailing values all being 0s may cause brittle tests to fail. |
| |
| // LIBC_COPT_FLOAT_TO_STR_USE_INT_CALC |
| // Integer Calculation uses wide integers to do the calculations for the Ryu |
| // Printf table, which is just as accurate as the Mega Table without requiring |
| // as much code size. These integers can be very large (~32KB at max, though |
| // always on the stack) to handle the edges of the long double range. They are |
| // also very slow, taking multiple seconds on a powerful CPU to calculate the |
| // values at the end of the range. If no flag is set, this is used for long |
| // doubles, the flag only changes the double behavior. |
| |
| // LIBC_COPT_FLOAT_TO_STR_NO_TABLE |
| // This flag doesn't change the actual calculation method, instead it is used |
| // to disable the normal Ryu Printf table for configurations that don't use any |
| // table at all. |
| |
| // Default Config: |
| // If no flags are set, doubles use the normal (and much more reasonably sized) |
| // Ryu Printf table and long doubles use their specialized implementation. This |
| // provides good performance and binary size. |
| |
| #ifdef LIBC_COPT_FLOAT_TO_STR_USE_MEGA_LONG_DOUBLE_TABLE |
| #include "src/__support/ryu_long_double_constants.h" |
| #elif !defined(LIBC_COPT_FLOAT_TO_STR_NO_TABLE) |
| #include "src/__support/ryu_constants.h" |
| #else |
| constexpr size_t IDX_SIZE = 1; |
| constexpr size_t MID_INT_SIZE = 192; |
| #endif |
| |
| // This implementation is based on the Ryu Printf algorithm by Ulf Adams: |
| // Ulf Adams. 2019. Ryƫ revisited: printf floating point conversion. |
| // Proc. ACM Program. Lang. 3, OOPSLA, Article 169 (October 2019), 23 pages. |
| // https://doi.org/10.1145/3360595 |
| |
| // This version is modified to require significantly less memory (it doesn't use |
| // a large buffer to store the result). |
| |
| // The general concept of this algorithm is as follows: |
| // We want to calculate a 9 digit segment of a floating point number using this |
| // formula: floor((mantissa * 2^exponent)/10^i) % 10^9. |
| // To do so normally would involve large integers (~1000 bits for doubles), so |
| // we use a shortcut. We can avoid calculating 2^exponent / 10^i by using a |
| // lookup table. The resulting intermediate value needs to be about 192 bits to |
| // store the result with enough precision. Since this is all being done with |
| // integers for appropriate precision, we would run into a problem if |
| // i > exponent since then 2^exponent / 10^i would be less than 1. To correct |
| // for this, the actual calculation done is 2^(exponent + c) / 10^i, and then |
| // when multiplying by the mantissa we reverse this by dividing by 2^c, like so: |
| // floor((mantissa * table[exponent][i])/(2^c)) % 10^9. |
| // This gives a 9 digit value, which is small enough to fit in a 32 bit integer, |
| // and that integer is converted into a string as normal, and called a block. In |
| // this implementation, the most recent block is buffered, so that if rounding |
| // is necessary the block can be adjusted before being written to the output. |
| // Any block that is all 9s adds one to the max block counter and doesn't clear |
| // the buffer because they can cause the block above them to be rounded up. |
| |
| namespace LIBC_NAMESPACE { |
| |
| using BlockInt = uint32_t; |
| constexpr uint32_t BLOCK_SIZE = 9; |
| constexpr uint64_t EXP5_9 = 1953125; |
| constexpr uint64_t EXP10_9 = 1000000000; |
| |
| using FPBits = fputil::FPBits<long double>; |
| |
| // Larger numbers prefer a slightly larger constant than is used for the smaller |
| // numbers. |
| constexpr size_t CALC_SHIFT_CONST = 128; |
| |
| namespace internal { |
| |
| // Returns floor(log_10(2^e)); requires 0 <= e <= 42039. |
| LIBC_INLINE constexpr uint32_t log10_pow2(uint64_t e) { |
| LIBC_ASSERT(e <= 42039 && |
| "Incorrect exponent to perform log10_pow2 approximation."); |
| // This approximation is based on the float value for log_10(2). It first |
| // gives an incorrect result for our purposes at 42039 (well beyond the 16383 |
| // maximum for long doubles). |
| |
| // To get these constants I first evaluated log_10(2) to get an approximation |
| // of 0.301029996. Next I passed that value through a string to double |
| // conversion to get an explicit mantissa of 0x13441350fbd738 and an exponent |
| // of -2 (which becomes -54 when we shift the mantissa to be a non-fractional |
| // number). Next I shifted the mantissa right 12 bits to create more space for |
| // the multiplication result, adding 12 to the exponent to compensate. To |
| // check that this approximation works for our purposes I used the following |
| // python code: |
| // for i in range(16384): |
| // if(len(str(2**i)) != (((i*0x13441350fbd)>>42)+1)): |
| // print(i) |
| // The reason we add 1 is because this evaluation truncates the result, giving |
| // us the floor, whereas counting the digits of the power of 2 gives us the |
| // ceiling. With a similar loop I checked the maximum valid value and found |
| // 42039. |
| return static_cast<uint32_t>((e * 0x13441350fbdll) >> 42); |
| } |
| |
| // Same as above, but with different constants. |
| LIBC_INLINE constexpr uint32_t log2_pow5(uint64_t e) { |
| return static_cast<uint32_t>((e * 0x12934f0979bll) >> 39); |
| } |
| |
| // Returns 1 + floor(log_10(2^e). This could technically be off by 1 if any |
| // power of 2 was also a power of 10, but since that doesn't exist this is |
| // always accurate. This is used to calculate the maximum number of base-10 |
| // digits a given e-bit number could have. |
| LIBC_INLINE constexpr uint32_t ceil_log10_pow2(uint32_t e) { |
| return log10_pow2(e) + 1; |
| } |
| |
| LIBC_INLINE constexpr uint32_t div_ceil(uint32_t num, uint32_t denom) { |
| return (num + (denom - 1)) / denom; |
| } |
| |
| // Returns the maximum number of 9 digit blocks a number described by the given |
| // index (which is ceil(exponent/16)) and mantissa width could need. |
| LIBC_INLINE constexpr uint32_t length_for_num(uint32_t idx, |
| uint32_t mantissa_width) { |
| return div_ceil(ceil_log10_pow2(idx) + ceil_log10_pow2(mantissa_width + 1), |
| BLOCK_SIZE); |
| } |
| |
| // The formula for the table when i is positive (or zero) is as follows: |
| // floor(10^(-9i) * 2^(e + c_1) + 1) % (10^9 * 2^c_1) |
| // Rewritten slightly we get: |
| // floor(5^(-9i) * 2^(e + c_1 - 9i) + 1) % (10^9 * 2^c_1) |
| |
| // TODO: Fix long doubles (needs bigger table or alternate algorithm.) |
| // Currently the table values are generated, which is very slow. |
| template <size_t INT_SIZE> |
| LIBC_INLINE constexpr UInt<MID_INT_SIZE> get_table_positive(int exponent, |
| size_t i) { |
| // INT_SIZE is the size of int that is used for the internal calculations of |
| // this function. It should be large enough to hold 2^(exponent+constant), so |
| // ~1000 for double and ~16000 for long double. Be warned that the time |
| // complexity of exponentiation is O(n^2 * log_2(m)) where n is the number of |
| // bits in the number being exponentiated and m is the exponent. |
| const int shift_amount = |
| static_cast<int>(exponent + CALC_SHIFT_CONST - (BLOCK_SIZE * i)); |
| if (shift_amount < 0) { |
| return 1; |
| } |
| UInt<INT_SIZE> num(0); |
| // MOD_SIZE is one of the limiting factors for how big the constant argument |
| // can get, since it needs to be small enough to fit in the result UInt, |
| // otherwise we'll get truncation on return. |
| constexpr UInt<INT_SIZE> MOD_SIZE = |
| (UInt<INT_SIZE>(EXP10_9) |
| << (CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0))); |
| |
| num = UInt<INT_SIZE>(1) << (shift_amount); |
| if (i > 0) { |
| UInt<INT_SIZE> fives(EXP5_9); |
| fives.pow_n(i); |
| num = num / fives; |
| } |
| |
| num = num + 1; |
| if (num > MOD_SIZE) { |
| auto rem = num.div_uint_half_times_pow_2( |
| EXP10_9, CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0)) |
| .value(); |
| num = rem; |
| } |
| return num; |
| } |
| |
| template <size_t INT_SIZE> |
| LIBC_INLINE UInt<MID_INT_SIZE> get_table_positive_df(int exponent, size_t i) { |
| static_assert(INT_SIZE == 256, |
| "Only 256 is supported as an int size right now."); |
| // This version uses dyadic floats with 256 bit mantissas to perform the same |
| // calculation as above. Due to floating point imprecision it is only accurate |
| // for the first 50 digits, but it's much faster. Since even 128 bit long |
| // doubles are only accurate to ~35 digits, the 50 digits of accuracy are |
| // enough for these floats to be converted back and forth safely. This is |
| // ideal for avoiding the size of the long double table. |
| const int shift_amount = |
| static_cast<int>(exponent + CALC_SHIFT_CONST - (9 * i)); |
| if (shift_amount < 0) { |
| return 1; |
| } |
| fputil::DyadicFloat<INT_SIZE> num(false, 0, 1); |
| constexpr UInt<INT_SIZE> MOD_SIZE = |
| (UInt<INT_SIZE>(EXP10_9) |
| << (CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0))); |
| |
| constexpr UInt<INT_SIZE> FIVE_EXP_MINUS_NINE_MANT{ |
| {0xf387295d242602a7, 0xfdd7645e011abac9, 0x31680a88f8953030, |
| 0x89705f4136b4a597}}; |
| |
| static const fputil::DyadicFloat<INT_SIZE> FIVE_EXP_MINUS_NINE( |
| false, -276, FIVE_EXP_MINUS_NINE_MANT); |
| |
| if (i > 0) { |
| fputil::DyadicFloat<INT_SIZE> fives = fputil::pow_n(FIVE_EXP_MINUS_NINE, i); |
| num = fives; |
| } |
| num = mul_pow_2(num, shift_amount); |
| |
| // Adding one is part of the formula. |
| UInt<INT_SIZE> int_num = static_cast<UInt<INT_SIZE>>(num) + 1; |
| if (int_num > MOD_SIZE) { |
| auto rem = |
| int_num |
| .div_uint_half_times_pow_2( |
| EXP10_9, CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0)) |
| .value(); |
| int_num = rem; |
| } |
| |
| UInt<MID_INT_SIZE> result = int_num; |
| |
| return result; |
| } |
| |
| // The formula for the table when i is negative (or zero) is as follows: |
| // floor(10^(-9i) * 2^(c_0 - e)) % (10^9 * 2^c_0) |
| // Since we know i is always negative, we just take it as unsigned and treat it |
| // as negative. We do the same with exponent, while they're both always negative |
| // in theory, in practice they're converted to positive for simpler |
| // calculations. |
| // The formula being used looks more like this: |
| // floor(10^(9*(-i)) * 2^(c_0 + (-e))) % (10^9 * 2^c_0) |
| template <size_t INT_SIZE> |
| LIBC_INLINE UInt<MID_INT_SIZE> get_table_negative(int exponent, size_t i) { |
| int shift_amount = CALC_SHIFT_CONST - exponent; |
| UInt<INT_SIZE> num(1); |
| constexpr UInt<INT_SIZE> MOD_SIZE = |
| (UInt<INT_SIZE>(EXP10_9) |
| << (CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0))); |
| |
| size_t ten_blocks = i; |
| size_t five_blocks = 0; |
| if (shift_amount < 0) { |
| int block_shifts = (-shift_amount) / BLOCK_SIZE; |
| if (block_shifts < static_cast<int>(ten_blocks)) { |
| ten_blocks = ten_blocks - block_shifts; |
| five_blocks = block_shifts; |
| shift_amount = shift_amount + (block_shifts * BLOCK_SIZE); |
| } else { |
| ten_blocks = 0; |
| five_blocks = i; |
| shift_amount = shift_amount + (static_cast<int>(i) * BLOCK_SIZE); |
| } |
| } |
| |
| if (five_blocks > 0) { |
| UInt<INT_SIZE> fives(EXP5_9); |
| fives.pow_n(five_blocks); |
| num = fives; |
| } |
| if (ten_blocks > 0) { |
| UInt<INT_SIZE> tens(EXP10_9); |
| tens.pow_n(ten_blocks); |
| if (five_blocks <= 0) { |
| num = tens; |
| } else { |
| num *= tens; |
| } |
| } |
| |
| if (shift_amount > 0) { |
| num = num << shift_amount; |
| } else { |
| num = num >> (-shift_amount); |
| } |
| if (num > MOD_SIZE) { |
| auto rem = num.div_uint_half_times_pow_2( |
| EXP10_9, CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0)) |
| .value(); |
| num = rem; |
| } |
| return num; |
| } |
| |
| template <size_t INT_SIZE> |
| LIBC_INLINE UInt<MID_INT_SIZE> get_table_negative_df(int exponent, size_t i) { |
| static_assert(INT_SIZE == 256, |
| "Only 256 is supported as an int size right now."); |
| // This version uses dyadic floats with 256 bit mantissas to perform the same |
| // calculation as above. Due to floating point imprecision it is only accurate |
| // for the first 50 digits, but it's much faster. Since even 128 bit long |
| // doubles are only accurate to ~35 digits, the 50 digits of accuracy are |
| // enough for these floats to be converted back and forth safely. This is |
| // ideal for avoiding the size of the long double table. |
| |
| int shift_amount = CALC_SHIFT_CONST - exponent; |
| |
| fputil::DyadicFloat<INT_SIZE> num(false, 0, 1); |
| constexpr UInt<INT_SIZE> MOD_SIZE = |
| (UInt<INT_SIZE>(EXP10_9) |
| << (CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0))); |
| |
| constexpr UInt<INT_SIZE> TEN_EXP_NINE_MANT(EXP10_9); |
| |
| static const fputil::DyadicFloat<INT_SIZE> TEN_EXP_NINE(false, 0, |
| TEN_EXP_NINE_MANT); |
| |
| if (i > 0) { |
| fputil::DyadicFloat<INT_SIZE> tens = fputil::pow_n(TEN_EXP_NINE, i); |
| num = tens; |
| } |
| num = mul_pow_2(num, shift_amount); |
| |
| UInt<INT_SIZE> int_num = static_cast<UInt<INT_SIZE>>(num); |
| if (int_num > MOD_SIZE) { |
| auto rem = |
| int_num |
| .div_uint_half_times_pow_2( |
| EXP10_9, CALC_SHIFT_CONST + (IDX_SIZE > 1 ? IDX_SIZE : 0)) |
| .value(); |
| int_num = rem; |
| } |
| |
| UInt<MID_INT_SIZE> result = int_num; |
| |
| return result; |
| } |
| |
| LIBC_INLINE uint32_t fast_uint_mod_1e9(const UInt<MID_INT_SIZE> &val) { |
| // The formula for mult_const is: |
| // 1 + floor((2^(bits in target integer size + log_2(divider))) / divider) |
| // Where divider is 10^9 and target integer size is 128. |
| const UInt<MID_INT_SIZE> mult_const( |
| {0x31680A88F8953031u, 0x89705F4136B4A597u, 0}); |
| const auto middle = (mult_const * val); |
| const uint64_t result = static_cast<uint64_t>(middle[2]); |
| const uint64_t shifted = result >> 29; |
| return static_cast<uint32_t>(static_cast<uint32_t>(val) - |
| (EXP10_9 * shifted)); |
| } |
| |
| LIBC_INLINE uint32_t mul_shift_mod_1e9(const FPBits::StorageType mantissa, |
| const UInt<MID_INT_SIZE> &large, |
| const int32_t shift_amount) { |
| UInt<MID_INT_SIZE + FPBits::STORAGE_LEN> val(large); |
| val = (val * mantissa) >> shift_amount; |
| return static_cast<uint32_t>( |
| val.div_uint_half_times_pow_2(static_cast<uint32_t>(EXP10_9), 0).value()); |
| } |
| |
| } // namespace internal |
| |
| // Convert floating point values to their string representation. |
| // Because the result may not fit in a reasonably sized array, the caller must |
| // request blocks of digits and convert them from integers to strings themself. |
| // Blocks contain the most digits that can be stored in an BlockInt. This is 9 |
| // digits for a 32 bit int and 18 digits for a 64 bit int. |
| // The intended use pattern is to create a FloatToString object of the |
| // appropriate type, then call get_positive_blocks to get an approximate number |
| // of blocks there are before the decimal point. Now the client code can start |
| // calling get_positive_block in a loop from the number of positive blocks to |
| // zero. This will give all digits before the decimal point. Then the user can |
| // start calling get_negative_block in a loop from 0 until the number of digits |
| // they need is reached. As an optimization, the client can use |
| // zero_blocks_after_point to find the number of blocks that are guaranteed to |
| // be zero after the decimal point and before the non-zero digits. Additionally, |
| // is_lowest_block will return if the current block is the lowest non-zero |
| // block. |
| template <typename T, cpp::enable_if_t<cpp::is_floating_point_v<T>, int> = 0> |
| class FloatToString { |
| fputil::FPBits<T> float_bits; |
| int exponent; |
| FPBits::StorageType mantissa; |
| |
| static constexpr int FRACTION_LEN = fputil::FPBits<T>::FRACTION_LEN; |
| static constexpr int EXP_BIAS = fputil::FPBits<T>::EXP_BIAS; |
| |
| public: |
| LIBC_INLINE constexpr FloatToString(T init_float) : float_bits(init_float) { |
| exponent = float_bits.get_explicit_exponent(); |
| mantissa = float_bits.get_explicit_mantissa(); |
| |
| // Adjust for the width of the mantissa. |
| exponent -= FRACTION_LEN; |
| } |
| |
| LIBC_INLINE constexpr bool is_nan() { return float_bits.is_nan(); } |
| LIBC_INLINE constexpr bool is_inf() { return float_bits.is_inf(); } |
| LIBC_INLINE constexpr bool is_inf_or_nan() { |
| return float_bits.is_inf_or_nan(); |
| } |
| |
| // get_block returns an integer that represents the digits in the requested |
| // block. |
| LIBC_INLINE constexpr BlockInt get_positive_block(int block_index) { |
| if (exponent >= -FRACTION_LEN) { |
| // idx is ceil(exponent/16) or 0 if exponent is negative. This is used to |
| // find the coarse section of the POW10_SPLIT table that will be used to |
| // calculate the 9 digit window, as well as some other related values. |
| const uint32_t idx = |
| exponent < 0 |
| ? 0 |
| : static_cast<uint32_t>(exponent + (IDX_SIZE - 1)) / IDX_SIZE; |
| |
| // shift_amount = -(c0 - exponent) = c_0 + 16 * ceil(exponent/16) - |
| // exponent |
| |
| const uint32_t pos_exp = idx * IDX_SIZE; |
| |
| UInt<MID_INT_SIZE> val; |
| |
| #if defined(LIBC_COPT_FLOAT_TO_STR_USE_DYADIC_FLOAT) |
| // ----------------------- DYADIC FLOAT CALC MODE ------------------------ |
| const int32_t SHIFT_CONST = CALC_SHIFT_CONST; |
| val = internal::get_table_positive_df<256>(IDX_SIZE * idx, block_index); |
| #elif defined(LIBC_COPT_FLOAT_TO_STR_USE_INT_CALC) |
| |
| // ---------------------------- INT CALC MODE ---------------------------- |
| const int32_t SHIFT_CONST = CALC_SHIFT_CONST; |
| const uint64_t MAX_POW_2_SIZE = |
| pos_exp + CALC_SHIFT_CONST - (BLOCK_SIZE * block_index); |
| const uint64_t MAX_POW_5_SIZE = |
| internal::log2_pow5(BLOCK_SIZE * block_index); |
| const uint64_t MAX_INT_SIZE = |
| (MAX_POW_2_SIZE > MAX_POW_5_SIZE) ? MAX_POW_2_SIZE : MAX_POW_5_SIZE; |
| |
| if (MAX_INT_SIZE < 1024) { |
| val = internal::get_table_positive<1024>(pos_exp, block_index); |
| } else if (MAX_INT_SIZE < 2048) { |
| val = internal::get_table_positive<2048>(pos_exp, block_index); |
| } else if (MAX_INT_SIZE < 4096) { |
| val = internal::get_table_positive<4096>(pos_exp, block_index); |
| } else if (MAX_INT_SIZE < 8192) { |
| val = internal::get_table_positive<8192>(pos_exp, block_index); |
| } else if (MAX_INT_SIZE < 16384) { |
| val = internal::get_table_positive<16384>(pos_exp, block_index); |
| } else { |
| val = internal::get_table_positive<16384 + 128>(pos_exp, block_index); |
| } |
| #else |
| // ----------------------------- TABLE MODE ------------------------------ |
| const int32_t SHIFT_CONST = TABLE_SHIFT_CONST; |
| |
| val = POW10_SPLIT[POW10_OFFSET[idx] + block_index]; |
| #endif |
| const uint32_t shift_amount = SHIFT_CONST + pos_exp - exponent; |
| |
| const BlockInt digits = |
| internal::mul_shift_mod_1e9(mantissa, val, (int32_t)(shift_amount)); |
| return digits; |
| } else { |
| return 0; |
| } |
| } |
| |
| LIBC_INLINE constexpr BlockInt get_negative_block(int block_index) { |
| if (exponent < 0) { |
| const int32_t idx = -exponent / IDX_SIZE; |
| |
| UInt<MID_INT_SIZE> val; |
| |
| const uint32_t pos_exp = static_cast<uint32_t>(idx * IDX_SIZE); |
| |
| #if defined(LIBC_COPT_FLOAT_TO_STR_USE_DYADIC_FLOAT) |
| // ----------------------- DYADIC FLOAT CALC MODE ------------------------ |
| const int32_t SHIFT_CONST = CALC_SHIFT_CONST; |
| val = internal::get_table_negative_df<256>(pos_exp, block_index + 1); |
| #elif defined(LIBC_COPT_FLOAT_TO_STR_USE_INT_CALC) |
| // ---------------------------- INT CALC MODE ---------------------------- |
| const int32_t SHIFT_CONST = CALC_SHIFT_CONST; |
| |
| const uint64_t NUM_FIVES = (block_index + 1) * BLOCK_SIZE; |
| // Round MAX_INT_SIZE up to the nearest 64 (adding 1 because log2_pow5 |
| // implicitly rounds down). |
| const uint64_t MAX_INT_SIZE = |
| ((internal::log2_pow5(NUM_FIVES) / 64) + 1) * 64; |
| |
| if (MAX_INT_SIZE < 1024) { |
| val = internal::get_table_negative<1024>(pos_exp, block_index + 1); |
| } else if (MAX_INT_SIZE < 2048) { |
| val = internal::get_table_negative<2048>(pos_exp, block_index + 1); |
| } else if (MAX_INT_SIZE < 4096) { |
| val = internal::get_table_negative<4096>(pos_exp, block_index + 1); |
| } else if (MAX_INT_SIZE < 8192) { |
| val = internal::get_table_negative<8192>(pos_exp, block_index + 1); |
| } else if (MAX_INT_SIZE < 16384) { |
| val = internal::get_table_negative<16384>(pos_exp, block_index + 1); |
| } else { |
| val = internal::get_table_negative<16384 + 8192>(pos_exp, |
| block_index + 1); |
| } |
| #else |
| // ----------------------------- TABLE MODE ------------------------------ |
| // if the requested block is zero |
| const int32_t SHIFT_CONST = TABLE_SHIFT_CONST; |
| if (block_index < MIN_BLOCK_2[idx]) { |
| return 0; |
| } |
| const uint32_t p = POW10_OFFSET_2[idx] + block_index - MIN_BLOCK_2[idx]; |
| // If every digit after the requested block is zero. |
| if (p >= POW10_OFFSET_2[idx + 1]) { |
| return 0; |
| } |
| |
| val = POW10_SPLIT_2[p]; |
| #endif |
| const int32_t shift_amount = |
| SHIFT_CONST + (-exponent - static_cast<int32_t>(pos_exp)); |
| BlockInt digits = |
| internal::mul_shift_mod_1e9(mantissa, val, shift_amount); |
| return digits; |
| } else { |
| return 0; |
| } |
| } |
| |
| LIBC_INLINE constexpr BlockInt get_block(int block_index) { |
| if (block_index >= 0) { |
| return get_positive_block(block_index); |
| } else { |
| return get_negative_block(-1 - block_index); |
| } |
| } |
| |
| LIBC_INLINE constexpr size_t get_positive_blocks() { |
| if (exponent < -FRACTION_LEN) |
| return 0; |
| const uint32_t idx = |
| exponent < 0 |
| ? 0 |
| : static_cast<uint32_t>(exponent + (IDX_SIZE - 1)) / IDX_SIZE; |
| return internal::length_for_num(idx * IDX_SIZE, FRACTION_LEN); |
| } |
| |
| // This takes the index of a block after the decimal point (a negative block) |
| // and return if it's sure that all of the digits after it are zero. |
| LIBC_INLINE constexpr bool is_lowest_block(size_t negative_block_index) { |
| #ifdef LIBC_COPT_FLOAT_TO_STR_NO_TABLE |
| // The decimal representation of 2**(-i) will have exactly i digits after |
| // the decimal point. |
| int num_requested_digits = |
| static_cast<int>((negative_block_index + 1) * BLOCK_SIZE); |
| |
| return num_requested_digits > -exponent; |
| #else |
| const int32_t idx = -exponent / IDX_SIZE; |
| const size_t p = |
| POW10_OFFSET_2[idx] + negative_block_index - MIN_BLOCK_2[idx]; |
| // If the remaining digits are all 0, then this is the lowest block. |
| return p >= POW10_OFFSET_2[idx + 1]; |
| #endif |
| } |
| |
| LIBC_INLINE constexpr size_t zero_blocks_after_point() { |
| #ifdef LIBC_COPT_FLOAT_TO_STR_NO_TABLE |
| if (exponent < -FRACTION_LEN) { |
| const int pos_exp = -exponent - 1; |
| const uint32_t pos_idx = |
| static_cast<uint32_t>(pos_exp + (IDX_SIZE - 1)) / IDX_SIZE; |
| const int32_t pos_len = ((internal::ceil_log10_pow2(pos_idx * IDX_SIZE) - |
| internal::ceil_log10_pow2(FRACTION_LEN + 1)) / |
| BLOCK_SIZE) - |
| 1; |
| return static_cast<uint32_t>(pos_len > 0 ? pos_len : 0); |
| } |
| return 0; |
| #else |
| return MIN_BLOCK_2[-exponent / IDX_SIZE]; |
| #endif |
| } |
| }; |
| |
| #if !defined(LIBC_TYPES_LONG_DOUBLE_IS_FLOAT64) && \ |
| !defined(LIBC_COPT_FLOAT_TO_STR_NO_SPECIALIZE_LD) |
| // --------------------------- LONG DOUBLE FUNCTIONS --------------------------- |
| |
| // this algorithm will work exactly the same for 80 bit and 128 bit long |
| // doubles. They have the same max exponent, but even if they didn't the |
| // constants should be calculated to be correct for any provided floating point |
| // type. |
| |
| template <> class FloatToString<long double> { |
| fputil::FPBits<long double> float_bits; |
| bool is_negative = 0; |
| int exponent = 0; |
| FPBits::StorageType mantissa = 0; |
| |
| static constexpr int FRACTION_LEN = fputil::FPBits<long double>::FRACTION_LEN; |
| static constexpr int EXP_BIAS = fputil::FPBits<long double>::EXP_BIAS; |
| static constexpr size_t UINT_WORD_SIZE = 64; |
| |
| static constexpr size_t FLOAT_AS_INT_WIDTH = |
| internal::div_ceil(fputil::FPBits<long double>::MAX_BIASED_EXPONENT - |
| FPBits::EXP_BIAS, |
| UINT_WORD_SIZE) * |
| UINT_WORD_SIZE; |
| static constexpr size_t EXTRA_INT_WIDTH = |
| internal::div_ceil(sizeof(long double) * CHAR_BIT, UINT_WORD_SIZE) * |
| UINT_WORD_SIZE; |
| |
| using wide_int = UInt<FLOAT_AS_INT_WIDTH + EXTRA_INT_WIDTH>; |
| |
| // float_as_fixed represents the floating point number as a fixed point number |
| // with the point EXTRA_INT_WIDTH bits from the left of the number. This can |
| // store any number with a negative exponent. |
| wide_int float_as_fixed = 0; |
| int int_block_index = 0; |
| |
| static constexpr size_t BLOCK_BUFFER_LEN = |
| internal::div_ceil(internal::log10_pow2(FLOAT_AS_INT_WIDTH), BLOCK_SIZE) + |
| 1; |
| BlockInt block_buffer[BLOCK_BUFFER_LEN] = {0}; |
| size_t block_buffer_valid = 0; |
| |
| template <size_t Bits> |
| LIBC_INLINE static constexpr BlockInt grab_digits(UInt<Bits> &int_num) { |
| auto wide_result = int_num.div_uint_half_times_pow_2(EXP5_9, 9); |
| // the optional only comes into effect when dividing by 0, which will |
| // never happen here. Thus, we just assert that it has value. |
| LIBC_ASSERT(wide_result.has_value()); |
| return static_cast<BlockInt>(wide_result.value()); |
| } |
| |
| LIBC_INLINE static constexpr void zero_leading_digits(wide_int &int_num) { |
| // WORD_SIZE is the width of the numbers used to internally represent the |
| // UInt |
| for (size_t i = 0; i < EXTRA_INT_WIDTH / wide_int::WORD_SIZE; ++i) |
| int_num[i + (FLOAT_AS_INT_WIDTH / wide_int::WORD_SIZE)] = 0; |
| } |
| |
| // init_convert initializes float_as_int, cur_block, and block_buffer based on |
| // the mantissa and exponent of the initial number. Calling it will always |
| // return the class to the starting state. |
| LIBC_INLINE constexpr void init_convert() { |
| // No calculation necessary for the 0 case. |
| if (mantissa == 0 && exponent == 0) |
| return; |
| |
| if (exponent > 0) { |
| // if the exponent is positive, then the number is fully above the decimal |
| // point. In this case we represent the float as an integer, then divide |
| // by 10^BLOCK_SIZE and take the remainder as our next block. This |
| // generates the digits from right to left, but the digits will be written |
| // from left to right, so it caches the results so they can be read in |
| // reverse order. |
| |
| wide_int float_as_int = mantissa; |
| |
| float_as_int <<= exponent; |
| int_block_index = 0; |
| |
| while (float_as_int > 0) { |
| LIBC_ASSERT(int_block_index < static_cast<int>(BLOCK_BUFFER_LEN)); |
| block_buffer[int_block_index] = |
| grab_digits<FLOAT_AS_INT_WIDTH + EXTRA_INT_WIDTH>(float_as_int); |
| ++int_block_index; |
| } |
| block_buffer_valid = int_block_index; |
| |
| } else { |
| // if the exponent is not positive, then the number is at least partially |
| // below the decimal point. In this case we represent the float as a fixed |
| // point number with the decimal point after the top EXTRA_INT_WIDTH bits. |
| float_as_fixed = mantissa; |
| |
| const int SHIFT_AMOUNT = FLOAT_AS_INT_WIDTH + exponent; |
| static_assert(EXTRA_INT_WIDTH >= sizeof(long double) * 8); |
| float_as_fixed <<= SHIFT_AMOUNT; |
| |
| // If there are still digits above the decimal point, handle those. |
| if (cpp::countl_zero(float_as_fixed) < |
| static_cast<int>(EXTRA_INT_WIDTH)) { |
| UInt<EXTRA_INT_WIDTH> above_decimal_point = |
| float_as_fixed >> FLOAT_AS_INT_WIDTH; |
| |
| size_t positive_int_block_index = 0; |
| while (above_decimal_point > 0) { |
| block_buffer[positive_int_block_index] = |
| grab_digits<EXTRA_INT_WIDTH>(above_decimal_point); |
| ++positive_int_block_index; |
| } |
| block_buffer_valid = positive_int_block_index; |
| |
| // Zero all digits above the decimal point. |
| zero_leading_digits(float_as_fixed); |
| int_block_index = 0; |
| } |
| } |
| } |
| |
| public: |
| LIBC_INLINE constexpr FloatToString(long double init_float) |
| : float_bits(init_float) { |
| is_negative = float_bits.is_neg(); |
| exponent = float_bits.get_explicit_exponent(); |
| mantissa = float_bits.get_explicit_mantissa(); |
| |
| // Adjust for the width of the mantissa. |
| exponent -= FRACTION_LEN; |
| |
| this->init_convert(); |
| } |
| |
| LIBC_INLINE constexpr size_t get_positive_blocks() { |
| if (exponent < -FRACTION_LEN) |
| return 0; |
| |
| const uint32_t idx = |
| exponent < 0 |
| ? 0 |
| : static_cast<uint32_t>(exponent + (IDX_SIZE - 1)) / IDX_SIZE; |
| return internal::length_for_num(idx * IDX_SIZE, FRACTION_LEN); |
| } |
| |
| LIBC_INLINE constexpr size_t zero_blocks_after_point() { |
| #ifdef LIBC_COPT_FLOAT_TO_STR_USE_MEGA_LONG_DOUBLE_TABLE |
| return MIN_BLOCK_2[-exponent / IDX_SIZE]; |
| #else |
| if (exponent >= -FRACTION_LEN) |
| return 0; |
| |
| const int pos_exp = -exponent - 1; |
| const uint32_t pos_idx = |
| static_cast<uint32_t>(pos_exp + (IDX_SIZE - 1)) / IDX_SIZE; |
| const int32_t pos_len = ((internal::ceil_log10_pow2(pos_idx * IDX_SIZE) - |
| internal::ceil_log10_pow2(FRACTION_LEN + 1)) / |
| BLOCK_SIZE) - |
| 1; |
| return static_cast<uint32_t>(pos_len > 0 ? pos_len : 0); |
| #endif |
| } |
| |
| LIBC_INLINE constexpr bool is_lowest_block(size_t negative_block_index) { |
| // The decimal representation of 2**(-i) will have exactly i digits after |
| // the decimal point. |
| const int num_requested_digits = |
| static_cast<int>((negative_block_index + 1) * BLOCK_SIZE); |
| |
| return num_requested_digits > -exponent; |
| } |
| |
| LIBC_INLINE constexpr BlockInt get_positive_block(int block_index) { |
| if (exponent < -FRACTION_LEN) |
| return 0; |
| if (block_index > static_cast<int>(block_buffer_valid) || block_index < 0) |
| return 0; |
| |
| LIBC_ASSERT(block_index < static_cast<int>(BLOCK_BUFFER_LEN)); |
| |
| return block_buffer[block_index]; |
| } |
| |
| LIBC_INLINE constexpr BlockInt get_negative_block(int negative_block_index) { |
| if (exponent >= 0) |
| return 0; |
| |
| // negative_block_index starts at 0 with the first block after the decimal |
| // point, and 1 with the second and so on. This converts to the same |
| // block_index used everywhere else. |
| |
| const int block_index = -1 - negative_block_index; |
| |
| // If we're currently after the requested block (remember these are |
| // negative indices) we reset the number to the start. This is only |
| // likely to happen in %g calls. This will also reset int_block_index. |
| // if (block_index > int_block_index) { |
| // init_convert(); |
| // } |
| |
| // Printf is the only existing user of this code and it will only ever move |
| // downwards, except for %g but that currently creates a second |
| // float_to_string object so this assertion still holds. If a new user needs |
| // the ability to step backwards, uncomment the code above. |
| LIBC_ASSERT(block_index <= int_block_index); |
| |
| // If we are currently before the requested block. Step until we reach the |
| // requested block. This is likely to only be one step. |
| while (block_index < int_block_index) { |
| zero_leading_digits(float_as_fixed); |
| float_as_fixed.mul(EXP10_9); |
| --int_block_index; |
| } |
| |
| // We're now on the requested block, return the current block. |
| return static_cast<BlockInt>(float_as_fixed >> FLOAT_AS_INT_WIDTH); |
| } |
| |
| LIBC_INLINE constexpr BlockInt get_block(int block_index) { |
| if (block_index >= 0) |
| return get_positive_block(block_index); |
| |
| return get_negative_block(-1 - block_index); |
| } |
| }; |
| |
| #endif // !LIBC_TYPES_LONG_DOUBLE_IS_FLOAT64 && |
| // !LIBC_COPT_FLOAT_TO_STR_NO_SPECIALIZE_LD |
| |
| } // namespace LIBC_NAMESPACE |
| |
| #endif // LLVM_LIBC_SRC___SUPPORT_FLOAT_TO_STRING_H |
