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Numerics abs acos acosf acosh acoshf acoshl acosl asin asinf asinh asinhf asinhl asinl atan atan2 atan2f atan2l atanf atanh atanhf atanhl atanl cabs cabsf cabsl cacos cacosf cacosh cacoshf cacoshl cacosl carg cargf cargl casin casinf casinh casinhf casinhl casinl catan catanf catanh catanhf catanhl catanl cbrt cbrtf cbrtl ccos ccosf ccosh ccoshf ccoshl ccosl ceil ceilf ceill cexp cexpf cexpl cimag cimagf cimagl clog clogf clogl CMPLX CMPLXF CMPLXL Common mathematical functions complex Complex number arithmetic conj conjf conjl copysign copysignf copysignl cos cosf cosh coshf coshl cosl cpow cpowf cpowl cproj cprojf cprojl creal crealf creall csin csinf csinh csinhf csinhl csinl csqrt csqrtf csqrtl ctan ctanf ctanh ctanhf ctanhl ctanl div double_t erf erfc erfcf erfcl erff erfl exp exp2 exp2f exp2l expf expl expm1 expm1f expm1l fabs fabsf fabsl fdim feclearexcept fegetenv fegetexceptflag fegetround feholdexcept feraiseexcept fesetenv fesetexceptflag fesetround fetestexcept feupdateenv FE_ALL_EXCEPT FE_DFL_ENV FE_DIVBYZERO FE_DOWNWARD FE_INEXACT FE_INVALID FE_OVERFLOW FE_TONEAREST FE_TOWARDZERO FE_UNDERFLOW FE_UPWARD Floating-point environment float_t floor floorf floorl fma fmaf fmal fmax fmaxf fmaxl fmin fminf fminl fmod fmodf fmodl fpclassify FP_INFINITE FP_NAN FP_NORMAL FP_SUBNORMAL FP_ZERO frexp frexpf frexpl HUGE_VAL HUGE_VALF HUGE_VALL hypot hypotf hypotl I ilogb ilogbf ilogbl imaginary imaxabs imaxdiv INFINITY isfinite isgreater isgreaterequal isinf isless islessequal islessgreater isnan isnormal isunordered labs ldexp ldexpf ldexpl ldiv lgamma lgammaf lgammal llabs lldiv llrint llrintf llrintl llround llroundf llroundl log log10 log10f log10l log1p log1pf log1pl log2 log2f log2l logb logbf logbl logf logl lrint lrintf lrintl lround lroundf lroundl MATH_ERREXCEPT math_errhandling MATH_ERRNO modf modff modfl nan NAN nanf nanl nearbyint nearbyintf nearbyintl nextafter nextafterf nextafterl nexttoward nexttowardf nexttowardl Numerics pow powf powl Pseudo-random number generation rand RAND_MAX remainder remainderf remainderl remquo remquof remquol rint rintf rintl round roundf roundl scalbln scalblnf scalblnl scalbn scalbnf scalbnl signbit sin sinf sinh sinhf sinhl sinl sqrt sqrtf sqrtl srand tan tanf tanh tanhf tanhl tanl tgamma tgammaf tgammal trunc truncf truncl Type-generic math _Complex_I _Imaginary_I Program support abort atexit at_quick_exit exit EXIT_FAILURE EXIT_SUCCESS getenv getenv_s jmp_buf longjmp Program support utilities quick_exit raise setjmp SIGABRT SIGFPE SIGILL SIGINT signal SIGSEGV SIGTERM sig_atomic_t SIG_DFL SIG_ERR SIG_IGN system _Exit Strings atof atoi atol atoll btowc c16rtomb c32rtomb char16_t char32_t isalnum isalpha isblank iscntrl isdigit isgraph islower isprint ispunct isspace isupper iswalnum iswalpha iswblank iswcntrl iswctype iswdigit iswgraph iswlower iswprint iswpunct iswspace iswupper iswxdigit isxdigit mblen mbrlen mbrtoc16 mbrtoc32 mbrtowc mbsinit mbsrtowcs mbsrtowcs_s mbstate_t mbstowcs mbstowcs_s mbtowc memchr memcmp memcpy memcpy_s memmove memmove_s memset memset_s Null-terminated byte strings Null-terminated multibyte strings Null-terminated wide strings strcat strcat_s strchr strcmp strcoll strcpy strcpy_s strcspn strerror strerrorlen_s strerror_s Strings library strlen strncat Thread support call_once cnd_broadcast cnd_destroy cnd_init cnd_signal cnd_timedwait cnd_wait mtx_destroy mtx_init mtx_lock mtx_plain mtx_recursive mtx_timed mtx_timedlock mtx_trylock mtx_unlock once_flag ONCE_FLAG_INIT thrd_busy thrd_create thrd_current thrd_detach thrd_equal thrd_error thrd_exit thrd_join thrd_nomem thrd_sleep thrd_success thrd_timedout thrd_yield Thread support library thread_local tss_create tss_delete TSS_DTOR_ITERATIONS tss_get tss_set Type support Boolean type support library Fixed width integer types FLT_EVAL_METHOD FLT_ROUNDS max_align_t NULL Numeric limits offsetof ptrdiff_t size_t Type support Variadic functions Variadic functions va_arg va_copy va_end va_list va_start

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在头文件<math.h>中定义



float       lgammaf( float arg );

(1)

(since C99)

double      lgamma( double arg );

(2)

(since C99)

long double lgammal( long double arg );

(3)

(since C99)

Defined in header <tgmath.h>



#define lgamma( arg )

(4)

(since C99)

1-3)计算的绝对值的自然对数伽马函数的arg

4)类型 - 通用宏:如果arg有类型long doublelgammal被调用。否则,如果arg有整数类型或类型doublelgamma则调用。否则,lgammaf被调用。

参数

arg

-

浮点值

返回值

如果没有发生错误,伽玛函数的对数值arg即log

e|∫∞

0_t_arg-1

e -td t |返回。

如果发生极错误+HUGE_VAL+HUGE_VALF+HUGE_VALL返回。

如果范围误差由于发生溢出,±HUGE_VAL±HUGE_VALF,或±HUGE_VALL返回。

错误处理

按照math_errhandling中的指定报告错误。

如果arg是零或者是小于零的整数,则可能会发生极点错误。

如果实现支持IEEE浮点运算(IEC 60559),

  • 如果参数是1,则返回+0

  • 如果参数是2,则返回+0

  • 如果参数为±0,则返回+∞并将FE_DIVBYZERO其升高

  • 如果参数是负整数,+∞被返回,并FE_DIVBYZERO提高

  • 如果参数是±∞,则返回+∞。

  • 如果参数是NaN,则返回NaN

笔记

如果arg是自然数,lgamma(arg)则是阶乘的对数arg-1

lgamma的POSIX版本不是线程安全的:函数的每次执行都会将gamma函数的符号存储arg在静态外部变量中signgam。一些实现提供lgamma_r了将用户提供的存储指针作为第二个参数并且是线程安全的。

gamma在各种实现中有一个非标准函数,但其定义不一致。例如,glibc和4.2BSD版本gamma执行lgamma,但4.4BSD版本gamma执行tgamma

#include <stdio.h>#include <math.h>#include <float.h>#include <errno.h>#include <fenv.h>#pragma STDC FENV_ACCESS ON
int main(void){    printf("lgamma(10) = %f, log(9!)=%f\n", lgamma(10), log(2*3*4*5*6*7*8*9));
    double pi = acos(-1);    printf("lgamma(0.5) = %f, log(sqrt(pi)) = %f\n", log(sqrt(pi)), lgamma(0.5));    // special values    printf("lgamma(1) = %f\n", lgamma(1));    printf("lgamma(+Inf) = %f\n", lgamma(INFINITY));    //error handling
    errno = 0; feclearexcept(FE_ALL_EXCEPT);    printf("lgamma(0) = %f\n", lgamma(0));    if(errno == ERANGE) perror("    errno == ERANGE");    if(fetestexcept(FE_DIVBYZERO)) puts("    FE_DIVBYZERO raised");}

可能的输出:

lgamma(10) = 12.801827, log(9!)=12.801827lgamma(0.5) = 0.572365, log(sqrt(pi)) = 0.572365lgamma(1) = 0.000000lgamma(+Inf) = inflgamma(0) = inf
    errno == ERANGE: Numerical result out of range
    FE_DIVBYZERO raised

参考

  • C11标准(ISO / IEC 9899:2011):

    • 7.12.8.3 lgamma函数(p:250)

    • 7.25类型通用数学<tgmath.h>(p:373-375)

    • F.10.5.3 lgamma函数(p:525)

  • C99标准(ISO / IEC 9899:1999):

    • 7.12.8.3 lgamma函数(p:231)

    • 7.22类型通用数学<tgmath.h>(p:335-337)

    • F.9.5.3 lgamma函数(p:462)

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