Rmpfr (version 0.7-2)

mpfr-special-functions: Special Mathematical Functions (MPFR)

Description

Special Mathematical Functions, supported by the MPFR Library.

Usage

zeta(x)
Ei(x)
Li2(x)

erf(x) erfc(x)

Arguments

x

a numeric or '>mpfr vector.

Value

A vector of the same length as x, of class '>mpfr.

Details

zeta(x) computes Riemann's Zeta function \(\zeta(x)\) important in analytical number theory and related fields. The traditional definition is $$\zeta(x) = \sum_{n=1}^\infty \frac{1}{n^x}.$$

Ei(x) computes the exponential integral, $$\int_{-\infty}^{x} \frac{e^t}{t} \; dt.$$

Li2(x) computes the dilogarithm, $$\int_{0}^{x} \frac{-log(1-t)}{t} \; dt.$$

erf(x) and erfc(x) are the error, respectively complementary error function which are both reparametrizations of pnorm, erf(x) = 2*pnorm(sqrt(2)*x) and erfc(x) = 2* pnorm(sqrt(2)*x, lower=FALSE), and hence Rmpfr provides its own version of pnorm.

See Also

pnorm in standard package stats; the class description '>mpfr mentioning the generic arithmetic and mathematical functions (sin, log, …, etc) for which "mpfr" methods are available.

Note the (integer order, non modified) Bessel functions \(j_0()\), \(y_n()\), etc, named j0, yn etc, and Airy function \(Ai()\) in Bessel_mpfr.

Examples

Run this code
# NOT RUN {
curve(Ei,  0, 5, n=2001)

## As we now require (mpfrVersion() >= "2.4.0"):
curve(Li2,  0,    5, n=2001)
curve(Li2, -2,   13, n=2000); abline(h=0,v=0, lty=3)
curve(Li2, -200,400, n=2000); abline(h=0,v=0, lty=3)

curve(erf, -3,3, col = "red", ylim = c(-1,2))
curve(erfc, add = TRUE, col = "blue")
abline(h=0, v=0, lty=3)
legend(-3,1, c("erf(x)", "erfc(x)"), col = c("red","blue"), lty=1)
# }

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