/*===---- __clang_hip_math.h - Device-side HIP math support ----------------=== * * 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 __CLANG_HIP_MATH_H__ #define __CLANG_HIP_MATH_H__ #if !defined(__HIP__) #error "This file is for HIP and OpenMP AMDGCN device compilation only." #endif #if !defined(__HIPCC_RTC__) #if defined(__cplusplus) #include #endif #include #include #endif // __HIPCC_RTC__ #pragma push_macro("__DEVICE__") #define __DEVICE__ static __device__ inline __attribute__((always_inline)) // A few functions return bool type starting only in C++11. #pragma push_macro("__RETURN_TYPE") #if defined(__cplusplus) #define __RETURN_TYPE bool #else #define __RETURN_TYPE int #endif #if defined (__cplusplus) && __cplusplus < 201103L // emulate static_assert on type sizes template struct __compare_result{}; template<> struct __compare_result { static const __device__ bool valid; }; __DEVICE__ void __suppress_unused_warning(bool b){}; template __DEVICE__ void __static_assert_equal_size() { __suppress_unused_warning(__compare_result::valid); } #define __static_assert_type_size_equal(A, B) \ __static_assert_equal_size() #else #define __static_assert_type_size_equal(A,B) \ static_assert((A) == (B), "") #endif __DEVICE__ uint64_t __make_mantissa_base8(const char *__tagp) { uint64_t __r = 0; while (__tagp) { char __tmp = *__tagp; if (__tmp >= '0' && __tmp <= '7') __r = (__r * 8u) + __tmp - '0'; else return 0; ++__tagp; } return __r; } __DEVICE__ uint64_t __make_mantissa_base10(const char *__tagp) { uint64_t __r = 0; while (__tagp) { char __tmp = *__tagp; if (__tmp >= '0' && __tmp <= '9') __r = (__r * 10u) + __tmp - '0'; else return 0; ++__tagp; } return __r; } __DEVICE__ uint64_t __make_mantissa_base16(const char *__tagp) { uint64_t __r = 0; while (__tagp) { char __tmp = *__tagp; if (__tmp >= '0' && __tmp <= '9') __r = (__r * 16u) + __tmp - '0'; else if (__tmp >= 'a' && __tmp <= 'f') __r = (__r * 16u) + __tmp - 'a' + 10; else if (__tmp >= 'A' && __tmp <= 'F') __r = (__r * 16u) + __tmp - 'A' + 10; else return 0; ++__tagp; } return __r; } __DEVICE__ uint64_t __make_mantissa(const char *__tagp) { if (!__tagp) return 0u; if (*__tagp == '0') { ++__tagp; if (*__tagp == 'x' || *__tagp == 'X') return __make_mantissa_base16(__tagp); else return __make_mantissa_base8(__tagp); } return __make_mantissa_base10(__tagp); } // BEGIN FLOAT #if defined(__cplusplus) __DEVICE__ int abs(int __x) { int __sgn = __x >> (sizeof(int) * CHAR_BIT - 1); return (__x ^ __sgn) - __sgn; } __DEVICE__ long labs(long __x) { long __sgn = __x >> (sizeof(long) * CHAR_BIT - 1); return (__x ^ __sgn) - __sgn; } __DEVICE__ long long llabs(long long __x) { long long __sgn = __x >> (sizeof(long long) * CHAR_BIT - 1); return (__x ^ __sgn) - __sgn; } #endif __DEVICE__ float acosf(float __x) { return __ocml_acos_f32(__x); } __DEVICE__ float acoshf(float __x) { return __ocml_acosh_f32(__x); } __DEVICE__ float asinf(float __x) { return __ocml_asin_f32(__x); } __DEVICE__ float asinhf(float __x) { return __ocml_asinh_f32(__x); } __DEVICE__ float atan2f(float __x, float __y) { return __ocml_atan2_f32(__x, __y); } __DEVICE__ float atanf(float __x) { return __ocml_atan_f32(__x); } __DEVICE__ float atanhf(float __x) { return __ocml_atanh_f32(__x); } __DEVICE__ float cbrtf(float __x) { return __ocml_cbrt_f32(__x); } __DEVICE__ float ceilf(float __x) { return __ocml_ceil_f32(__x); } __DEVICE__ float copysignf(float __x, float __y) { return __ocml_copysign_f32(__x, __y); } __DEVICE__ float cosf(float __x) { return __ocml_cos_f32(__x); } __DEVICE__ float coshf(float __x) { return __ocml_cosh_f32(__x); } __DEVICE__ float cospif(float __x) { return __ocml_cospi_f32(__x); } __DEVICE__ float cyl_bessel_i0f(float __x) { return __ocml_i0_f32(__x); } __DEVICE__ float cyl_bessel_i1f(float __x) { return __ocml_i1_f32(__x); } __DEVICE__ float erfcf(float __x) { return __ocml_erfc_f32(__x); } __DEVICE__ float erfcinvf(float __x) { return __ocml_erfcinv_f32(__x); } __DEVICE__ float erfcxf(float __x) { return __ocml_erfcx_f32(__x); } __DEVICE__ float erff(float __x) { return __ocml_erf_f32(__x); } __DEVICE__ float erfinvf(float __x) { return __ocml_erfinv_f32(__x); } __DEVICE__ float exp10f(float __x) { return __ocml_exp10_f32(__x); } __DEVICE__ float exp2f(float __x) { return __ocml_exp2_f32(__x); } __DEVICE__ float expf(float __x) { return __ocml_exp_f32(__x); } __DEVICE__ float expm1f(float __x) { return __ocml_expm1_f32(__x); } __DEVICE__ float fabsf(float __x) { return __ocml_fabs_f32(__x); } __DEVICE__ float fdimf(float __x, float __y) { return __ocml_fdim_f32(__x, __y); } __DEVICE__ float fdividef(float __x, float __y) { return __x / __y; } __DEVICE__ float floorf(float __x) { return __ocml_floor_f32(__x); } __DEVICE__ float fmaf(float __x, float __y, float __z) { return __ocml_fma_f32(__x, __y, __z); } __DEVICE__ float fmaxf(float __x, float __y) { return __ocml_fmax_f32(__x, __y); } __DEVICE__ float fminf(float __x, float __y) { return __ocml_fmin_f32(__x, __y); } __DEVICE__ float fmodf(float __x, float __y) { return __ocml_fmod_f32(__x, __y); } __DEVICE__ float frexpf(float __x, int *__nptr) { int __tmp; float __r = __ocml_frexp_f32(__x, (__attribute__((address_space(5))) int *)&__tmp); *__nptr = __tmp; return __r; } __DEVICE__ float hypotf(float __x, float __y) { return __ocml_hypot_f32(__x, __y); } __DEVICE__ int ilogbf(float __x) { return __ocml_ilogb_f32(__x); } __DEVICE__ __RETURN_TYPE __finitef(float __x) { return __ocml_isfinite_f32(__x); } __DEVICE__ __RETURN_TYPE __isinff(float __x) { return __ocml_isinf_f32(__x); } __DEVICE__ __RETURN_TYPE __isnanf(float __x) { return __ocml_isnan_f32(__x); } __DEVICE__ float j0f(float __x) { return __ocml_j0_f32(__x); } __DEVICE__ float j1f(float __x) { return __ocml_j1_f32(__x); } __DEVICE__ float jnf(int __n, float __x) { // TODO: we could use Ahmes multiplication // and the Miller & Brown algorithm // for linear recurrences to get O(log n) steps, but it's unclear if // it'd be beneficial in this case. if (__n == 0) return j0f(__x); if (__n == 1) return j1f(__x); float __x0 = j0f(__x); float __x1 = j1f(__x); for (int __i = 1; __i < __n; ++__i) { float __x2 = (2 * __i) / __x * __x1 - __x0; __x0 = __x1; __x1 = __x2; } return __x1; } __DEVICE__ float ldexpf(float __x, int __e) { return __ocml_ldexp_f32(__x, __e); } __DEVICE__ float lgammaf(float __x) { return __ocml_lgamma_f32(__x); } __DEVICE__ long long int llrintf(float __x) { return __ocml_rint_f32(__x); } __DEVICE__ long long int llroundf(float __x) { return __ocml_round_f32(__x); } __DEVICE__ float log10f(float __x) { return __ocml_log10_f32(__x); } __DEVICE__ float log1pf(float __x) { return __ocml_log1p_f32(__x); } __DEVICE__ float log2f(float __x) { return __ocml_log2_f32(__x); } __DEVICE__ float logbf(float __x) { return __ocml_logb_f32(__x); } __DEVICE__ float logf(float __x) { return __ocml_log_f32(__x); } __DEVICE__ long int lrintf(float __x) { return __ocml_rint_f32(__x); } __DEVICE__ long int lroundf(float __x) { return __ocml_round_f32(__x); } __DEVICE__ float modff(float __x, float *__iptr) { float __tmp; float __r = __ocml_modf_f32(__x, (__attribute__((address_space(5))) float *)&__tmp); *__iptr = __tmp; return __r; } __DEVICE__ float nanf(const char *__tagp) { union { float val; struct ieee_float { unsigned int mantissa : 22; unsigned int quiet : 1; unsigned int exponent : 8; unsigned int sign : 1; } bits; } __tmp; __static_assert_type_size_equal(sizeof(__tmp.val), sizeof(__tmp.bits)); __tmp.bits.sign = 0u; __tmp.bits.exponent = ~0u; __tmp.bits.quiet = 1u; __tmp.bits.mantissa = __make_mantissa(__tagp); return __tmp.val; } __DEVICE__ float nearbyintf(float __x) { return __ocml_nearbyint_f32(__x); } __DEVICE__ float nextafterf(float __x, float __y) { return __ocml_nextafter_f32(__x, __y); } __DEVICE__ float norm3df(float __x, float __y, float __z) { return __ocml_len3_f32(__x, __y, __z); } __DEVICE__ float norm4df(float __x, float __y, float __z, float __w) { return __ocml_len4_f32(__x, __y, __z, __w); } __DEVICE__ float normcdff(float __x) { return __ocml_ncdf_f32(__x); } __DEVICE__ float normcdfinvf(float __x) { return __ocml_ncdfinv_f32(__x); } __DEVICE__ float normf(int __dim, const float *__a) { // TODO: placeholder until OCML adds support. float __r = 0; while (__dim--) { __r += __a[0] * __a[0]; ++__a; } return __ocml_sqrt_f32(__r); } __DEVICE__ float powf(float __x, float __y) { return __ocml_pow_f32(__x, __y); } __DEVICE__ float powif(float __x, int __y) { return __ocml_pown_f32(__x, __y); } __DEVICE__ float rcbrtf(float __x) { return __ocml_rcbrt_f32(__x); } __DEVICE__ float remainderf(float __x, float __y) { return __ocml_remainder_f32(__x, __y); } __DEVICE__ float remquof(float __x, float __y, int *__quo) { int __tmp; float __r = __ocml_remquo_f32( __x, __y, (__attribute__((address_space(5))) int *)&__tmp); *__quo = __tmp; return __r; } __DEVICE__ float rhypotf(float __x, float __y) { return __ocml_rhypot_f32(__x, __y); } __DEVICE__ float rintf(float __x) { return __ocml_rint_f32(__x); } __DEVICE__ float rnorm3df(float __x, float __y, float __z) { return __ocml_rlen3_f32(__x, __y, __z); } __DEVICE__ float rnorm4df(float __x, float __y, float __z, float __w) { return __ocml_rlen4_f32(__x, __y, __z, __w); } __DEVICE__ float rnormf(int __dim, const float *__a) { // TODO: placeholder until OCML adds support. float __r = 0; while (__dim--) { __r += __a[0] * __a[0]; ++__a; } return __ocml_rsqrt_f32(__r); } __DEVICE__ float roundf(float __x) { return __ocml_round_f32(__x); } __DEVICE__ float rsqrtf(float __x) { return __ocml_rsqrt_f32(__x); } __DEVICE__ float scalblnf(float __x, long int __n) { return (__n < INT_MAX) ? __ocml_scalbn_f32(__x, __n) : __ocml_scalb_f32(__x, __n); } __DEVICE__ float scalbnf(float __x, int __n) { return __ocml_scalbn_f32(__x, __n); } __DEVICE__ __RETURN_TYPE __signbitf(float __x) { return __ocml_signbit_f32(__x); } __DEVICE__ void sincosf(float __x, float *__sinptr, float *__cosptr) { float __tmp; *__sinptr = __ocml_sincos_f32(__x, (__attribute__((address_space(5))) float *)&__tmp); *__cosptr = __tmp; } __DEVICE__ void sincospif(float __x, float *__sinptr, float *__cosptr) { float __tmp; *__sinptr = __ocml_sincospi_f32( __x, (__attribute__((address_space(5))) float *)&__tmp); *__cosptr = __tmp; } __DEVICE__ float sinf(float __x) { return __ocml_sin_f32(__x); } __DEVICE__ float sinhf(float __x) { return __ocml_sinh_f32(__x); } __DEVICE__ float sinpif(float __x) { return __ocml_sinpi_f32(__x); } __DEVICE__ float sqrtf(float __x) { return __ocml_sqrt_f32(__x); } __DEVICE__ float tanf(float __x) { return __ocml_tan_f32(__x); } __DEVICE__ float tanhf(float __x) { return __ocml_tanh_f32(__x); } __DEVICE__ float tgammaf(float __x) { return __ocml_tgamma_f32(__x); } __DEVICE__ float truncf(float __x) { return __ocml_trunc_f32(__x); } __DEVICE__ float y0f(float __x) { return __ocml_y0_f32(__x); } __DEVICE__ float y1f(float __x) { return __ocml_y1_f32(__x); } __DEVICE__ float ynf(int __n, float __x) { // TODO: we could use Ahmes multiplication // and the Miller & Brown algorithm // for linear recurrences to get O(log n) steps, but it's unclear if // it'd be beneficial in this case. Placeholder until OCML adds // support. if (__n == 0) return y0f(__x); if (__n == 1) return y1f(__x); float __x0 = y0f(__x); float __x1 = y1f(__x); for (int __i = 1; __i < __n; ++__i) { float __x2 = (2 * __i) / __x * __x1 - __x0; __x0 = __x1; __x1 = __x2; } return __x1; } // BEGIN INTRINSICS __DEVICE__ float __cosf(float __x) { return __ocml_native_cos_f32(__x); } __DEVICE__ float __exp10f(float __x) { return __ocml_native_exp10_f32(__x); } __DEVICE__ float __expf(float __x) { return __ocml_native_exp_f32(__x); } #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fadd_rd(float __x, float __y) { return __ocml_add_rtn_f32(__x, __y); } __DEVICE__ float __fadd_rn(float __x, float __y) { return __ocml_add_rte_f32(__x, __y); } __DEVICE__ float __fadd_ru(float __x, float __y) { return __ocml_add_rtp_f32(__x, __y); } __DEVICE__ float __fadd_rz(float __x, float __y) { return __ocml_add_rtz_f32(__x, __y); } #else __DEVICE__ float __fadd_rn(float __x, float __y) { return __x + __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fdiv_rd(float __x, float __y) { return __ocml_div_rtn_f32(__x, __y); } __DEVICE__ float __fdiv_rn(float __x, float __y) { return __ocml_div_rte_f32(__x, __y); } __DEVICE__ float __fdiv_ru(float __x, float __y) { return __ocml_div_rtp_f32(__x, __y); } __DEVICE__ float __fdiv_rz(float __x, float __y) { return __ocml_div_rtz_f32(__x, __y); } #else __DEVICE__ float __fdiv_rn(float __x, float __y) { return __x / __y; } #endif __DEVICE__ float __fdividef(float __x, float __y) { return __x / __y; } #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fmaf_rd(float __x, float __y, float __z) { return __ocml_fma_rtn_f32(__x, __y, __z); } __DEVICE__ float __fmaf_rn(float __x, float __y, float __z) { return __ocml_fma_rte_f32(__x, __y, __z); } __DEVICE__ float __fmaf_ru(float __x, float __y, float __z) { return __ocml_fma_rtp_f32(__x, __y, __z); } __DEVICE__ float __fmaf_rz(float __x, float __y, float __z) { return __ocml_fma_rtz_f32(__x, __y, __z); } #else __DEVICE__ float __fmaf_rn(float __x, float __y, float __z) { return __ocml_fma_f32(__x, __y, __z); } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fmul_rd(float __x, float __y) { return __ocml_mul_rtn_f32(__x, __y); } __DEVICE__ float __fmul_rn(float __x, float __y) { return __ocml_mul_rte_f32(__x, __y); } __DEVICE__ float __fmul_ru(float __x, float __y) { return __ocml_mul_rtp_f32(__x, __y); } __DEVICE__ float __fmul_rz(float __x, float __y) { return __ocml_mul_rtz_f32(__x, __y); } #else __DEVICE__ float __fmul_rn(float __x, float __y) { return __x * __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __frcp_rd(float __x) { return __ocml_div_rtn_f32(1.0f, __x); } __DEVICE__ float __frcp_rn(float __x) { return __ocml_div_rte_f32(1.0f, __x); } __DEVICE__ float __frcp_ru(float __x) { return __ocml_div_rtp_f32(1.0f, __x); } __DEVICE__ float __frcp_rz(float __x) { return __ocml_div_rtz_f32(1.0f, __x); } #else __DEVICE__ float __frcp_rn(float __x) { return 1.0f / __x; } #endif __DEVICE__ float __frsqrt_rn(float __x) { return __llvm_amdgcn_rsq_f32(__x); } #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fsqrt_rd(float __x) { return __ocml_sqrt_rtn_f32(__x); } __DEVICE__ float __fsqrt_rn(float __x) { return __ocml_sqrt_rte_f32(__x); } __DEVICE__ float __fsqrt_ru(float __x) { return __ocml_sqrt_rtp_f32(__x); } __DEVICE__ float __fsqrt_rz(float __x) { return __ocml_sqrt_rtz_f32(__x); } #else __DEVICE__ float __fsqrt_rn(float __x) { return __ocml_native_sqrt_f32(__x); } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ float __fsub_rd(float __x, float __y) { return __ocml_sub_rtn_f32(__x, __y); } __DEVICE__ float __fsub_rn(float __x, float __y) { return __ocml_sub_rte_f32(__x, __y); } __DEVICE__ float __fsub_ru(float __x, float __y) { return __ocml_sub_rtp_f32(__x, __y); } __DEVICE__ float __fsub_rz(float __x, float __y) { return __ocml_sub_rtz_f32(__x, __y); } #else __DEVICE__ float __fsub_rn(float __x, float __y) { return __x - __y; } #endif __DEVICE__ float __log10f(float __x) { return __ocml_native_log10_f32(__x); } __DEVICE__ float __log2f(float __x) { return __ocml_native_log2_f32(__x); } __DEVICE__ float __logf(float __x) { return __ocml_native_log_f32(__x); } __DEVICE__ float __powf(float __x, float __y) { return __ocml_pow_f32(__x, __y); } __DEVICE__ float __saturatef(float __x) { return (__x < 0) ? 0 : ((__x > 1) ? 1 : __x); } __DEVICE__ void __sincosf(float __x, float *__sinptr, float *__cosptr) { *__sinptr = __ocml_native_sin_f32(__x); *__cosptr = __ocml_native_cos_f32(__x); } __DEVICE__ float __sinf(float __x) { return __ocml_native_sin_f32(__x); } __DEVICE__ float __tanf(float __x) { return __ocml_tan_f32(__x); } // END INTRINSICS // END FLOAT // BEGIN DOUBLE __DEVICE__ double acos(double __x) { return __ocml_acos_f64(__x); } __DEVICE__ double acosh(double __x) { return __ocml_acosh_f64(__x); } __DEVICE__ double asin(double __x) { return __ocml_asin_f64(__x); } __DEVICE__ double asinh(double __x) { return __ocml_asinh_f64(__x); } __DEVICE__ double atan(double __x) { return __ocml_atan_f64(__x); } __DEVICE__ double atan2(double __x, double __y) { return __ocml_atan2_f64(__x, __y); } __DEVICE__ double atanh(double __x) { return __ocml_atanh_f64(__x); } __DEVICE__ double cbrt(double __x) { return __ocml_cbrt_f64(__x); } __DEVICE__ double ceil(double __x) { return __ocml_ceil_f64(__x); } __DEVICE__ double copysign(double __x, double __y) { return __ocml_copysign_f64(__x, __y); } __DEVICE__ double cos(double __x) { return __ocml_cos_f64(__x); } __DEVICE__ double cosh(double __x) { return __ocml_cosh_f64(__x); } __DEVICE__ double cospi(double __x) { return __ocml_cospi_f64(__x); } __DEVICE__ double cyl_bessel_i0(double __x) { return __ocml_i0_f64(__x); } __DEVICE__ double cyl_bessel_i1(double __x) { return __ocml_i1_f64(__x); } __DEVICE__ double erf(double __x) { return __ocml_erf_f64(__x); } __DEVICE__ double erfc(double __x) { return __ocml_erfc_f64(__x); } __DEVICE__ double erfcinv(double __x) { return __ocml_erfcinv_f64(__x); } __DEVICE__ double erfcx(double __x) { return __ocml_erfcx_f64(__x); } __DEVICE__ double erfinv(double __x) { return __ocml_erfinv_f64(__x); } __DEVICE__ double exp(double __x) { return __ocml_exp_f64(__x); } __DEVICE__ double exp10(double __x) { return __ocml_exp10_f64(__x); } __DEVICE__ double exp2(double __x) { return __ocml_exp2_f64(__x); } __DEVICE__ double expm1(double __x) { return __ocml_expm1_f64(__x); } __DEVICE__ double fabs(double __x) { return __ocml_fabs_f64(__x); } __DEVICE__ double fdim(double __x, double __y) { return __ocml_fdim_f64(__x, __y); } __DEVICE__ double floor(double __x) { return __ocml_floor_f64(__x); } __DEVICE__ double fma(double __x, double __y, double __z) { return __ocml_fma_f64(__x, __y, __z); } __DEVICE__ double fmax(double __x, double __y) { return __ocml_fmax_f64(__x, __y); } __DEVICE__ double fmin(double __x, double __y) { return __ocml_fmin_f64(__x, __y); } __DEVICE__ double fmod(double __x, double __y) { return __ocml_fmod_f64(__x, __y); } __DEVICE__ double frexp(double __x, int *__nptr) { int __tmp; double __r = __ocml_frexp_f64(__x, (__attribute__((address_space(5))) int *)&__tmp); *__nptr = __tmp; return __r; } __DEVICE__ double hypot(double __x, double __y) { return __ocml_hypot_f64(__x, __y); } __DEVICE__ int ilogb(double __x) { return __ocml_ilogb_f64(__x); } __DEVICE__ __RETURN_TYPE __finite(double __x) { return __ocml_isfinite_f64(__x); } __DEVICE__ __RETURN_TYPE __isinf(double __x) { return __ocml_isinf_f64(__x); } __DEVICE__ __RETURN_TYPE __isnan(double __x) { return __ocml_isnan_f64(__x); } __DEVICE__ double j0(double __x) { return __ocml_j0_f64(__x); } __DEVICE__ double j1(double __x) { return __ocml_j1_f64(__x); } __DEVICE__ double jn(int __n, double __x) { // TODO: we could use Ahmes multiplication // and the Miller & Brown algorithm // for linear recurrences to get O(log n) steps, but it's unclear if // it'd be beneficial in this case. Placeholder until OCML adds // support. if (__n == 0) return j0(__x); if (__n == 1) return j1(__x); double __x0 = j0(__x); double __x1 = j1(__x); for (int __i = 1; __i < __n; ++__i) { double __x2 = (2 * __i) / __x * __x1 - __x0; __x0 = __x1; __x1 = __x2; } return __x1; } __DEVICE__ double ldexp(double __x, int __e) { return __ocml_ldexp_f64(__x, __e); } __DEVICE__ double lgamma(double __x) { return __ocml_lgamma_f64(__x); } __DEVICE__ long long int llrint(double __x) { return __ocml_rint_f64(__x); } __DEVICE__ long long int llround(double __x) { return __ocml_round_f64(__x); } __DEVICE__ double log(double __x) { return __ocml_log_f64(__x); } __DEVICE__ double log10(double __x) { return __ocml_log10_f64(__x); } __DEVICE__ double log1p(double __x) { return __ocml_log1p_f64(__x); } __DEVICE__ double log2(double __x) { return __ocml_log2_f64(__x); } __DEVICE__ double logb(double __x) { return __ocml_logb_f64(__x); } __DEVICE__ long int lrint(double __x) { return __ocml_rint_f64(__x); } __DEVICE__ long int lround(double __x) { return __ocml_round_f64(__x); } __DEVICE__ double modf(double __x, double *__iptr) { double __tmp; double __r = __ocml_modf_f64(__x, (__attribute__((address_space(5))) double *)&__tmp); *__iptr = __tmp; return __r; } __DEVICE__ double nan(const char *__tagp) { #if !_WIN32 union { double val; struct ieee_double { uint64_t mantissa : 51; uint32_t quiet : 1; uint32_t exponent : 11; uint32_t sign : 1; } bits; } __tmp; __static_assert_type_size_equal(sizeof(__tmp.val), sizeof(__tmp.bits)); __tmp.bits.sign = 0u; __tmp.bits.exponent = ~0u; __tmp.bits.quiet = 1u; __tmp.bits.mantissa = __make_mantissa(__tagp); return __tmp.val; #else __static_assert_type_size_equal(sizeof(uint64_t), sizeof(double)); uint64_t __val = __make_mantissa(__tagp); __val |= 0xFFF << 51; return *reinterpret_cast(&__val); #endif } __DEVICE__ double nearbyint(double __x) { return __ocml_nearbyint_f64(__x); } __DEVICE__ double nextafter(double __x, double __y) { return __ocml_nextafter_f64(__x, __y); } __DEVICE__ double norm(int __dim, const double *__a) { // TODO: placeholder until OCML adds support. double __r = 0; while (__dim--) { __r += __a[0] * __a[0]; ++__a; } return __ocml_sqrt_f64(__r); } __DEVICE__ double norm3d(double __x, double __y, double __z) { return __ocml_len3_f64(__x, __y, __z); } __DEVICE__ double norm4d(double __x, double __y, double __z, double __w) { return __ocml_len4_f64(__x, __y, __z, __w); } __DEVICE__ double normcdf(double __x) { return __ocml_ncdf_f64(__x); } __DEVICE__ double normcdfinv(double __x) { return __ocml_ncdfinv_f64(__x); } __DEVICE__ double pow(double __x, double __y) { return __ocml_pow_f64(__x, __y); } __DEVICE__ double powi(double __x, int __y) { return __ocml_pown_f64(__x, __y); } __DEVICE__ double rcbrt(double __x) { return __ocml_rcbrt_f64(__x); } __DEVICE__ double remainder(double __x, double __y) { return __ocml_remainder_f64(__x, __y); } __DEVICE__ double remquo(double __x, double __y, int *__quo) { int __tmp; double __r = __ocml_remquo_f64( __x, __y, (__attribute__((address_space(5))) int *)&__tmp); *__quo = __tmp; return __r; } __DEVICE__ double rhypot(double __x, double __y) { return __ocml_rhypot_f64(__x, __y); } __DEVICE__ double rint(double __x) { return __ocml_rint_f64(__x); } __DEVICE__ double rnorm(int __dim, const double *__a) { // TODO: placeholder until OCML adds support. double __r = 0; while (__dim--) { __r += __a[0] * __a[0]; ++__a; } return __ocml_rsqrt_f64(__r); } __DEVICE__ double rnorm3d(double __x, double __y, double __z) { return __ocml_rlen3_f64(__x, __y, __z); } __DEVICE__ double rnorm4d(double __x, double __y, double __z, double __w) { return __ocml_rlen4_f64(__x, __y, __z, __w); } __DEVICE__ double round(double __x) { return __ocml_round_f64(__x); } __DEVICE__ double rsqrt(double __x) { return __ocml_rsqrt_f64(__x); } __DEVICE__ double scalbln(double __x, long int __n) { return (__n < INT_MAX) ? __ocml_scalbn_f64(__x, __n) : __ocml_scalb_f64(__x, __n); } __DEVICE__ double scalbn(double __x, int __n) { return __ocml_scalbn_f64(__x, __n); } __DEVICE__ __RETURN_TYPE __signbit(double __x) { return __ocml_signbit_f64(__x); } __DEVICE__ double sin(double __x) { return __ocml_sin_f64(__x); } __DEVICE__ void sincos(double __x, double *__sinptr, double *__cosptr) { double __tmp; *__sinptr = __ocml_sincos_f64( __x, (__attribute__((address_space(5))) double *)&__tmp); *__cosptr = __tmp; } __DEVICE__ void sincospi(double __x, double *__sinptr, double *__cosptr) { double __tmp; *__sinptr = __ocml_sincospi_f64( __x, (__attribute__((address_space(5))) double *)&__tmp); *__cosptr = __tmp; } __DEVICE__ double sinh(double __x) { return __ocml_sinh_f64(__x); } __DEVICE__ double sinpi(double __x) { return __ocml_sinpi_f64(__x); } __DEVICE__ double sqrt(double __x) { return __ocml_sqrt_f64(__x); } __DEVICE__ double tan(double __x) { return __ocml_tan_f64(__x); } __DEVICE__ double tanh(double __x) { return __ocml_tanh_f64(__x); } __DEVICE__ double tgamma(double __x) { return __ocml_tgamma_f64(__x); } __DEVICE__ double trunc(double __x) { return __ocml_trunc_f64(__x); } __DEVICE__ double y0(double __x) { return __ocml_y0_f64(__x); } __DEVICE__ double y1(double __x) { return __ocml_y1_f64(__x); } __DEVICE__ double yn(int __n, double __x) { // TODO: we could use Ahmes multiplication // and the Miller & Brown algorithm // for linear recurrences to get O(log n) steps, but it's unclear if // it'd be beneficial in this case. Placeholder until OCML adds // support. if (__n == 0) return y0(__x); if (__n == 1) return y1(__x); double __x0 = y0(__x); double __x1 = y1(__x); for (int __i = 1; __i < __n; ++__i) { double __x2 = (2 * __i) / __x * __x1 - __x0; __x0 = __x1; __x1 = __x2; } return __x1; } // BEGIN INTRINSICS #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __dadd_rd(double __x, double __y) { return __ocml_add_rtn_f64(__x, __y); } __DEVICE__ double __dadd_rn(double __x, double __y) { return __ocml_add_rte_f64(__x, __y); } __DEVICE__ double __dadd_ru(double __x, double __y) { return __ocml_add_rtp_f64(__x, __y); } __DEVICE__ double __dadd_rz(double __x, double __y) { return __ocml_add_rtz_f64(__x, __y); } #else __DEVICE__ double __dadd_rn(double __x, double __y) { return __x + __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __ddiv_rd(double __x, double __y) { return __ocml_div_rtn_f64(__x, __y); } __DEVICE__ double __ddiv_rn(double __x, double __y) { return __ocml_div_rte_f64(__x, __y); } __DEVICE__ double __ddiv_ru(double __x, double __y) { return __ocml_div_rtp_f64(__x, __y); } __DEVICE__ double __ddiv_rz(double __x, double __y) { return __ocml_div_rtz_f64(__x, __y); } #else __DEVICE__ double __ddiv_rn(double __x, double __y) { return __x / __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __dmul_rd(double __x, double __y) { return __ocml_mul_rtn_f64(__x, __y); } __DEVICE__ double __dmul_rn(double __x, double __y) { return __ocml_mul_rte_f64(__x, __y); } __DEVICE__ double __dmul_ru(double __x, double __y) { return __ocml_mul_rtp_f64(__x, __y); } __DEVICE__ double __dmul_rz(double __x, double __y) { return __ocml_mul_rtz_f64(__x, __y); } #else __DEVICE__ double __dmul_rn(double __x, double __y) { return __x * __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __drcp_rd(double __x) { return __ocml_div_rtn_f64(1.0, __x); } __DEVICE__ double __drcp_rn(double __x) { return __ocml_div_rte_f64(1.0, __x); } __DEVICE__ double __drcp_ru(double __x) { return __ocml_div_rtp_f64(1.0, __x); } __DEVICE__ double __drcp_rz(double __x) { return __ocml_div_rtz_f64(1.0, __x); } #else __DEVICE__ double __drcp_rn(double __x) { return 1.0 / __x; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __dsqrt_rd(double __x) { return __ocml_sqrt_rtn_f64(__x); } __DEVICE__ double __dsqrt_rn(double __x) { return __ocml_sqrt_rte_f64(__x); } __DEVICE__ double __dsqrt_ru(double __x) { return __ocml_sqrt_rtp_f64(__x); } __DEVICE__ double __dsqrt_rz(double __x) { return __ocml_sqrt_rtz_f64(__x); } #else __DEVICE__ double __dsqrt_rn(double __x) { return __ocml_sqrt_f64(__x); } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __dsub_rd(double __x, double __y) { return __ocml_sub_rtn_f64(__x, __y); } __DEVICE__ double __dsub_rn(double __x, double __y) { return __ocml_sub_rte_f64(__x, __y); } __DEVICE__ double __dsub_ru(double __x, double __y) { return __ocml_sub_rtp_f64(__x, __y); } __DEVICE__ double __dsub_rz(double __x, double __y) { return __ocml_sub_rtz_f64(__x, __y); } #else __DEVICE__ double __dsub_rn(double __x, double __y) { return __x - __y; } #endif #if defined OCML_BASIC_ROUNDED_OPERATIONS __DEVICE__ double __fma_rd(double __x, double __y, double __z) { return __ocml_fma_rtn_f64(__x, __y, __z); } __DEVICE__ double __fma_rn(double __x, double __y, double __z) { return __ocml_fma_rte_f64(__x, __y, __z); } __DEVICE__ double __fma_ru(double __x, double __y, double __z) { return __ocml_fma_rtp_f64(__x, __y, __z); } __DEVICE__ double __fma_rz(double __x, double __y, double __z) { return __ocml_fma_rtz_f64(__x, __y, __z); } #else __DEVICE__ double __fma_rn(double __x, double __y, double __z) { return __ocml_fma_f64(__x, __y, __z); } #endif // END INTRINSICS // END DOUBLE // C only macros #if !defined(__cplusplus) && __STDC_VERSION__ >= 201112L #define isfinite(__x) _Generic((__x), float : __finitef, double : __finite)(__x) #define isinf(__x) _Generic((__x), float : __isinff, double : __isinf)(__x) #define isnan(__x) _Generic((__x), float : __isnanf, double : __isnan)(__x) #define signbit(__x) \ _Generic((__x), float : __signbitf, double : __signbit)(__x) #endif // !defined(__cplusplus) && __STDC_VERSION__ >= 201112L #if defined(__cplusplus) template __DEVICE__ T min(T __arg1, T __arg2) { return (__arg1 < __arg2) ? __arg1 : __arg2; } template __DEVICE__ T max(T __arg1, T __arg2) { return (__arg1 > __arg2) ? __arg1 : __arg2; } __DEVICE__ int min(int __arg1, int __arg2) { return (__arg1 < __arg2) ? __arg1 : __arg2; } __DEVICE__ int max(int __arg1, int __arg2) { return (__arg1 > __arg2) ? __arg1 : __arg2; } __DEVICE__ float max(float __x, float __y) { return fmaxf(__x, __y); } __DEVICE__ double max(double __x, double __y) { return fmax(__x, __y); } __DEVICE__ float min(float __x, float __y) { return fminf(__x, __y); } __DEVICE__ double min(double __x, double __y) { return fmin(__x, __y); } #if !defined(__HIPCC_RTC__) __host__ inline static int min(int __arg1, int __arg2) { return std::min(__arg1, __arg2); } __host__ inline static int max(int __arg1, int __arg2) { return std::max(__arg1, __arg2); } #endif // __HIPCC_RTC__ #endif #pragma pop_macro("__DEVICE__") #pragma pop_macro("__RETURN_TYPE") #endif // __CLANG_HIP_MATH_H__