/* * Copyright (c) 2021, Leon Albrecht . * * SPDX-License-Identifier: BSD-2-Clause */ #pragma once #include #include #include #include namespace AK { template constexpr T NaN = __builtin_nan(""); template constexpr T Pi = 3.141592653589793238462643383279502884L; template constexpr T E = 2.718281828459045235360287471352662498L; namespace Details { template constexpr size_t product_even(); template<> constexpr size_t product_even<2>() { return 2; } template constexpr size_t product_even() { return value * product_even(); } template constexpr size_t product_odd(); template<> constexpr size_t product_odd<1>() { return 1; } template constexpr size_t product_odd() { return value * product_odd(); } } #define CONSTEXPR_STATE(function, args...) \ if (is_constant_evaluated()) { \ if (IsSame) \ return __builtin_##function##l(args); \ if (IsSame) \ return __builtin_##function(args); \ if (IsSame) \ return __builtin_##function##f(args); \ } namespace Division { template constexpr T fmod(T x, T y) { CONSTEXPR_STATE(fmod, x, y); u16 fpu_status; do { asm( "fprem\n" "fnstsw %%ax\n" : "+t"(x), "=a"(fpu_status) : "u"(y)); } while (fpu_status & 0x400); return x; } template constexpr T remainder(T x, T y) { CONSTEXPR_STATE(remainder, x, y); u16 fpu_status; do { asm( "fprem1\n" "fnstsw %%ax\n" : "+t"(x), "=a"(fpu_status) : "u"(y)); } while (fpu_status & 0x400); return x; } } using Division::fmod; using Division::remainder; template constexpr T sqrt(T x) { CONSTEXPR_STATE(sqrt, x); T res; asm("fsqrt" : "=t"(res) : "0"(x)); return res; } template constexpr T cbrt(T x) { CONSTEXPR_STATE(cbrt, x); if (__builtin_isinf(x) || x == 0) return x; if (x < 0) return -cbrt(-x); T r = x; T ex = 0; while (r < 0.125l) { r *= 8; ex--; } while (r > 1.0l) { r *= 0.125l; ex++; } r = (-0.46946116l * r + 1.072302l) * r + 0.3812513l; while (ex < 0) { r *= 0.5l; ex++; } while (ex > 0) { r *= 2.0l; ex--; } r = (2.0l / 3.0l) * r + (1.0l / 3.0l) * x / (r * r); r = (2.0l / 3.0l) * r + (1.0l / 3.0l) * x / (r * r); r = (2.0l / 3.0l) * r + (1.0l / 3.0l) * x / (r * r); r = (2.0l / 3.0l) * r + (1.0l / 3.0l) * x / (r * r); return r; } template constexpr T fabs(T x) { if (is_constant_evaluated()) return x < 0 ? -x : x; asm( "fabs" : "+t"(x)); return x; } namespace Trigonometry { template constexpr T hypot(T x, T y) { return sqrt(x * x + y * y); } template constexpr T sin(T angle) { CONSTEXPR_STATE(sin, angle); T ret; asm( "fsin" : "=t"(ret) : "0"(angle)); return ret; } template constexpr T cos(T angle) { CONSTEXPR_STATE(cos, angle); T ret; asm( "fcos" : "=t"(ret) : "0"(angle)); return ret; } template constexpr T tan(T angle) { CONSTEXPR_STATE(tan, angle); double ret, one; asm( "fptan" : "=t"(one), "=u"(ret) : "0"(angle)); return ret; } template constexpr T atan(T value) { CONSTEXPR_STATE(atan, value); T ret; asm( "fld1\n" "fpatan\n" : "=t"(ret) : "0"(value)); return ret; } template constexpr T asin(T x) { CONSTEXPR_STATE(asin, x); if (x > 1 || x < -1) return NaN; if (x > (T)0.5 || x < (T)-0.5) return 2 * atan(x / (1 + sqrt(1 - x * x))); T squared = x * x; T value = x; T i = x * squared; value += i * Details::product_odd<1>() / Details::product_even<2>() / 3; i *= squared; value += i * Details::product_odd<3>() / Details::product_even<4>() / 5; i *= squared; value += i * Details::product_odd<5>() / Details::product_even<6>() / 7; i *= squared; value += i * Details::product_odd<7>() / Details::product_even<8>() / 9; i *= squared; value += i * Details::product_odd<9>() / Details::product_even<10>() / 11; i *= squared; value += i * Details::product_odd<11>() / Details::product_even<12>() / 13; i *= squared; value += i * Details::product_odd<13>() / Details::product_even<14>() / 15; i *= squared; value += i * Details::product_odd<15>() / Details::product_even<16>() / 17; return value; } template constexpr T acos(T value) { CONSTEXPR_STATE(acos, value); // FIXME: I am naive return static_cast(0.5) * Pi - asin(value); } template constexpr T atan2(T y, T x) { CONSTEXPR_STATE(atan2, y, x); T ret; asm("fpatan" : "=t"(ret) : "0"(x), "u"(y) : "st(1)"); return ret; } } using Trigonometry::acos; using Trigonometry::asin; using Trigonometry::atan; using Trigonometry::atan2; using Trigonometry::cos; using Trigonometry::hypot; using Trigonometry::sin; using Trigonometry::tan; namespace Exponentials { template constexpr T log(T x) { CONSTEXPR_STATE(log, x); T ret; asm( "fldln2\n" "fxch %%st(1)\n" "fyl2x\n" : "=t"(ret) : "0"(x)); return ret; } template constexpr T log2(T x) { CONSTEXPR_STATE(log2, x); T ret; asm( "fld1\n" "fxch %%st(1)\n" "fyl2x\n" : "=t"(ret) : "0"(x)); return ret; } template constexpr T log2(T x) { return x ? (8 * sizeof(T) - 1) - count_leading_zeroes(static_cast>(x)) : 0; } template constexpr T log10(T x) { CONSTEXPR_STATE(log10, x); T ret; asm( "fldlg2\n" "fxch %%st(1)\n" "fyl2x\n" : "=t"(ret) : "0"(x)); return ret; } template constexpr T exp(T exponent) { CONSTEXPR_STATE(exp, exponent); T res; asm("fldl2e\n" "fmulp\n" "fld1\n" "fld %%st(1)\n" "fprem\n" "f2xm1\n" "faddp\n" "fscale\n" "fstp %%st(1)" : "=t"(res) : "0"(exponent)); return res; } template constexpr T exp2(T exponent) { CONSTEXPR_STATE(exp2, exponent); T res; asm("fld1\n" "fld %%st(1)\n" "fprem\n" "f2xm1\n" "faddp\n" "fscale\n" "fstp %%st(1)" : "=t"(res) : "0"(exponent)); return res; } template constexpr T exp2(T exponent) { return 1u << exponent; } } using Exponentials::exp; using Exponentials::exp2; using Exponentials::log; using Exponentials::log10; using Exponentials::log2; namespace Hyperbolic { template constexpr T sinh(T x) { T exponentiated = exp(x); if (x > 0) return (exponentiated * exponentiated - 1) / 2 / exponentiated; return (exponentiated - 1 / exponentiated) / 2; } template constexpr T cosh(T x) { CONSTEXPR_STATE(cosh, x); T exponentiated = exp(-x); if (x < 0) return (1 + exponentiated * exponentiated) / 2 / exponentiated; return (1 / exponentiated + exponentiated) / 2; } template constexpr T tanh(T x) { if (x > 0) { T exponentiated = exp(2 * x); return (exponentiated - 1) / (exponentiated + 1); } T plusX = exp(x); T minusX = 1 / plusX; return (plusX - minusX) / (plusX + minusX); } template constexpr T asinh(T x) { return log(x + sqrt(x * x + 1)); } template constexpr T acosh(T x) { return log(x + sqrt(x * x - 1)); } template constexpr T atanh(T x) { return log((1 + x) / (1 - x)) / (T)2.0l; } } using Hyperbolic::acosh; using Hyperbolic::asinh; using Hyperbolic::atanh; using Hyperbolic::cosh; using Hyperbolic::sinh; using Hyperbolic::tanh; template constexpr T pow(T x, T y) { CONSTEXPR_STATE(pow, x, y); // fixme I am naive if (__builtin_isnan(y)) return y; if (y == 0) return 1; if (x == 0) return 0; if (y == 1) return x; int y_as_int = (int)y; if (y == (T)y_as_int) { T result = x; for (int i = 0; i < fabs(y) - 1; ++i) result *= x; if (y < 0) result = 1.0l / result; return result; } return exp2(y * log2(x)); } #undef CONSTEXPR_STATE }