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These are some more exotic mathematical functions which are sometimes useful. Currently they only have real-valued versions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
erf returns the error function of x. The error
function is defined as
erf (x) = 2/sqrt(pi) * integral from 0 to x of exp(-t^2) dt
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
erfc returns 1.0 - erf(x), but computed in a
fashion that avoids round-off error when x is large.
Preliminary: | MT-Unsafe race:signgam | AS-Unsafe | AC-Safe | See POSIX Safety Concepts.
lgamma returns the natural logarithm of the absolute value of
the gamma function of x. The gamma function is defined as
gamma (x) = integral from 0 to ∞ of t^(x-1) e^-t dt
The sign of the gamma function is stored in the global variable
signgam, which is declared in math.h. It is 1 if
the intermediate result was positive or zero, or -1 if it was
negative.
To compute the real gamma function you can use the tgamma
function or you can compute the values as follows:
lgam = lgamma(x); gam = signgam*exp(lgam);
The gamma function has singularities at the non-positive integers.
lgamma will raise the zero divide exception if evaluated at a
singularity.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
lgamma_r is just like lgamma, but it stores the sign of
the intermediate result in the variable pointed to by signp
instead of in the signgam global. This means it is reentrant.
The lgammafN_r and lgammafNx_r functions are
GNU extensions.
Preliminary: | MT-Unsafe race:signgam | AS-Unsafe | AC-Safe | See POSIX Safety Concepts.
These functions exist for compatibility reasons. They are equivalent to
lgamma etc. It is better to use lgamma since for one the
name reflects better the actual computation, and moreover lgamma is
standardized in ISO C99 while gamma is not.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
tgamma applies the gamma function to x. The gamma
function is defined as
gamma (x) = integral from 0 to ∞ of t^(x-1) e^-t dt
This function was introduced in ISO C99. The _FloatN
and _FloatNx variants were introduced in ISO/IEC TS 18661-3.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
j0 returns the Bessel function of the first kind of order 0 of
x. It may signal underflow if x is too large.
The _FloatN and _FloatNx variants are GNU
extensions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
j1 returns the Bessel function of the first kind of order 1 of
x. It may signal underflow if x is too large.
The _FloatN and _FloatNx variants are GNU
extensions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
jn returns the Bessel function of the first kind of order
n of x. It may signal underflow if x is too large.
The _FloatN and _FloatNx variants are GNU
extensions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
y0 returns the Bessel function of the second kind of order 0 of
x. It may signal underflow if x is too large. If x
is negative, y0 signals a domain error; if it is zero,
y0 signals overflow and returns -∞.
The _FloatN and _FloatNx variants are GNU
extensions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
y1 returns the Bessel function of the second kind of order 1 of
x. It may signal underflow if x is too large. If x
is negative, y1 signals a domain error; if it is zero,
y1 signals overflow and returns -∞.
The _FloatN and _FloatNx variants are GNU
extensions.
Preliminary: | MT-Safe | AS-Safe | AC-Safe | See POSIX Safety Concepts.
yn returns the Bessel function of the second kind of order n of
x. It may signal underflow if x is too large. If x
is negative, yn signals a domain error; if it is zero,
yn signals overflow and returns -∞.
The _FloatN and _FloatNx variants are GNU
extensions.
Next: Known Maximum Errors in Math Functions, Previous: Hyperbolic Functions, Up: Mathematics [Contents][Index]