#ifndef AL_NUMERIC_H #define AL_NUMERIC_H #include #include #include #include #ifdef HAVE_INTRIN_H #include #endif #ifdef HAVE_SSE_INTRINSICS #include #endif #include "opthelpers.h" inline constexpr int64_t operator "" _i64(unsigned long long int n) noexcept { return static_cast(n); } inline constexpr uint64_t operator "" _u64(unsigned long long int n) noexcept { return static_cast(n); } constexpr inline float minf(float a, float b) noexcept { return ((a > b) ? b : a); } constexpr inline float maxf(float a, float b) noexcept { return ((a > b) ? a : b); } constexpr inline float clampf(float val, float min, float max) noexcept { return minf(max, maxf(min, val)); } constexpr inline double mind(double a, double b) noexcept { return ((a > b) ? b : a); } constexpr inline double maxd(double a, double b) noexcept { return ((a > b) ? a : b); } constexpr inline double clampd(double val, double min, double max) noexcept { return mind(max, maxd(min, val)); } constexpr inline unsigned int minu(unsigned int a, unsigned int b) noexcept { return ((a > b) ? b : a); } constexpr inline unsigned int maxu(unsigned int a, unsigned int b) noexcept { return ((a > b) ? a : b); } constexpr inline unsigned int clampu(unsigned int val, unsigned int min, unsigned int max) noexcept { return minu(max, maxu(min, val)); } constexpr inline int mini(int a, int b) noexcept { return ((a > b) ? b : a); } constexpr inline int maxi(int a, int b) noexcept { return ((a > b) ? a : b); } constexpr inline int clampi(int val, int min, int max) noexcept { return mini(max, maxi(min, val)); } constexpr inline int64_t mini64(int64_t a, int64_t b) noexcept { return ((a > b) ? b : a); } constexpr inline int64_t maxi64(int64_t a, int64_t b) noexcept { return ((a > b) ? a : b); } constexpr inline int64_t clampi64(int64_t val, int64_t min, int64_t max) noexcept { return mini64(max, maxi64(min, val)); } constexpr inline uint64_t minu64(uint64_t a, uint64_t b) noexcept { return ((a > b) ? b : a); } constexpr inline uint64_t maxu64(uint64_t a, uint64_t b) noexcept { return ((a > b) ? a : b); } constexpr inline uint64_t clampu64(uint64_t val, uint64_t min, uint64_t max) noexcept { return minu64(max, maxu64(min, val)); } constexpr inline size_t minz(size_t a, size_t b) noexcept { return ((a > b) ? b : a); } constexpr inline size_t maxz(size_t a, size_t b) noexcept { return ((a > b) ? a : b); } constexpr inline size_t clampz(size_t val, size_t min, size_t max) noexcept { return minz(max, maxz(min, val)); } constexpr inline float lerpf(float val1, float val2, float mu) noexcept { return val1 + (val2-val1)*mu; } constexpr inline float cubic(float val1, float val2, float val3, float val4, float mu) noexcept { const float mu2{mu*mu}, mu3{mu2*mu}; const float a0{-0.5f*mu3 + mu2 + -0.5f*mu}; const float a1{ 1.5f*mu3 + -2.5f*mu2 + 1.0f}; const float a2{-1.5f*mu3 + 2.0f*mu2 + 0.5f*mu}; const float a3{ 0.5f*mu3 + -0.5f*mu2}; return val1*a0 + val2*a1 + val3*a2 + val4*a3; } /** Find the next power-of-2 for non-power-of-2 numbers. */ inline uint32_t NextPowerOf2(uint32_t value) noexcept { if(value > 0) { value--; value |= value>>1; value |= value>>2; value |= value>>4; value |= value>>8; value |= value>>16; } return value+1; } /** Round up a value to the next multiple. */ inline size_t RoundUp(size_t value, size_t r) noexcept { value += r-1; return value - (value%r); } /** * Fast float-to-int conversion. No particular rounding mode is assumed; the * IEEE-754 default is round-to-nearest with ties-to-even, though an app could * change it on its own threads. On some systems, a truncating conversion may * always be the fastest method. */ inline int fastf2i(float f) noexcept { #if defined(HAVE_SSE_INTRINSICS) return _mm_cvt_ss2si(_mm_set_ss(f)); #elif defined(_MSC_VER) && defined(_M_IX86_FP) int i; __asm fld f __asm fistp i return i; #elif (defined(__GNUC__) || defined(__clang__)) && (defined(__i386__) || defined(__x86_64__)) int i; #ifdef __SSE_MATH__ __asm__("cvtss2si %1, %0" : "=r"(i) : "x"(f)); #else __asm__ __volatile__("fistpl %0" : "=m"(i) : "t"(f) : "st"); #endif return i; #else return static_cast(f); #endif } inline unsigned int fastf2u(float f) noexcept { return static_cast(fastf2i(f)); } /** Converts float-to-int using standard behavior (truncation). */ inline int float2int(float f) noexcept { #if defined(HAVE_SSE_INTRINSICS) return _mm_cvtt_ss2si(_mm_set_ss(f)); #elif (defined(_MSC_VER) && defined(_M_IX86_FP) && _M_IX86_FP == 0) \ || ((defined(__GNUC__) || defined(__clang__)) && (defined(__i386__) || defined(__x86_64__)) \ && !defined(__SSE_MATH__)) int sign, shift, mant; union { float f; int i; } conv; conv.f = f; sign = (conv.i>>31) | 1; shift = ((conv.i>>23)&0xff) - (127+23); /* Over/underflow */ if UNLIKELY(shift >= 31 || shift < -23) return 0; mant = (conv.i&0x7fffff) | 0x800000; if LIKELY(shift < 0) return (mant >> -shift) * sign; return (mant << shift) * sign; #else return static_cast(f); #endif } inline unsigned int float2uint(float f) noexcept { return static_cast(float2int(f)); } /** Converts double-to-int using standard behavior (truncation). */ inline int double2int(double d) noexcept { #if defined(HAVE_SSE_INTRINSICS) return _mm_cvttsd_si32(_mm_set_sd(d)); #elif (defined(_MSC_VER) && defined(_M_IX86_FP) && _M_IX86_FP < 2) \ || ((defined(__GNUC__) || defined(__clang__)) && (defined(__i386__) || defined(__x86_64__)) \ && !defined(__SSE2_MATH__)) int sign, shift; int64_t mant; union { double d; int64_t i64; } conv; conv.d = d; sign = (conv.i64 >> 63) | 1; shift = ((conv.i64 >> 52) & 0x7ff) - (1023 + 52); /* Over/underflow */ if UNLIKELY(shift >= 63 || shift < -52) return 0; mant = (conv.i64 & 0xfffffffffffff_i64) | 0x10000000000000_i64; if LIKELY(shift < 0) return (int)(mant >> -shift) * sign; return (int)(mant << shift) * sign; #else return static_cast(d); #endif } /** * Rounds a float to the nearest integral value, according to the current * rounding mode. This is essentially an inlined version of rintf, although * makes fewer promises (e.g. -0 or -0.25 rounded to 0 may result in +0). */ inline float fast_roundf(float f) noexcept { #if (defined(__GNUC__) || defined(__clang__)) && (defined(__i386__) || defined(__x86_64__)) \ && !defined(__SSE_MATH__) float out; __asm__ __volatile__("frndint" : "=t"(out) : "0"(f)); return out; #elif (defined(__GNUC__) || defined(__clang__)) && defined(__aarch64__) float out; __asm__ volatile("frintx %s0, %s1" : "=w"(out) : "w"(f)); return out; #else /* Integral limit, where sub-integral precision is not available for * floats. */ static const float ilim[2]{ 8388608.0f /* 0x1.0p+23 */, -8388608.0f /* -0x1.0p+23 */ }; unsigned int sign, expo; union { float f; unsigned int i; } conv; conv.f = f; sign = (conv.i>>31)&0x01; expo = (conv.i>>23)&0xff; if UNLIKELY(expo >= 150/*+23*/) { /* An exponent (base-2) of 23 or higher is incapable of sub-integral * precision, so it's already an integral value. We don't need to worry * about infinity or NaN here. */ return f; } /* Adding the integral limit to the value (with a matching sign) forces a * result that has no sub-integral precision, and is consequently forced to * round to an integral value. Removing the integral limit then restores * the initial value rounded to the integral. The compiler should not * optimize this out because of non-associative rules on floating-point * math (as long as you don't use -fassociative-math, * -funsafe-math-optimizations, -ffast-math, or -Ofast, in which case this * may break). */ f += ilim[sign]; return f - ilim[sign]; #endif } template constexpr const T& clamp(const T& value, const T& min_value, const T& max_value) noexcept { return std::min(std::max(value, min_value), max_value); } // Converts level (mB) to gain. inline float level_mb_to_gain(float x) { if(x <= -10'000.0f) return 0.0f; return std::pow(10.0f, x / 2'000.0f); } // Converts gain to level (mB). inline float gain_to_level_mb(float x) { if (x <= 0.0f) return -10'000.0f; return maxf(std::log10(x) * 2'000.0f, -10'000.0f); } #endif /* AL_NUMERIC_H */