| besselJs {Bessel} | R Documentation |
Computes the modified Bessel J function, using one of its basic
definitions as an infinite series, e.g. A. & S., p.360, (9.1.10). The
implementation is pure R, working for numeric,
complex, but also e.g., for objects of class
"mpfr" from package Rmpfr.
besselJs(x, nu, nterm = 800, log = FALSE,
Ceps = if (isNum) 8e-16 else 2^(-x@.Data[[1]]@prec))
x |
numeric or complex vector, or of another |
nu |
non-negative numeric (scalar). |
nterm |
integer indicating the number of terms to be used.
Should be in the order of |
log |
logical indicating if the logarithm |
Ceps |
a relative error tolerance for checking if |
a “numeric” (or complex or "mpfr")
vector of the same class and length as x.
Martin Maechler
Abramowitz, M., and Stegun, I. A. (1955, etc). Handbook of mathematical functions (NBS AMS series 55, U.S. Dept. of Commerce). http://people.math.sfu.ca/~cbm/aands/page_360.htm
This package BesselJ, base besselJ, etc
stopifnot(all.equal(besselJs(1:10, 1), # our R code
besselJ (1:10, 1)))# internal C code w/ different algorithm
## Large 'nu' ...
x <- (0:20)/4
(bx <- besselJ(x, nu=200))# base R's -- gives (mostly wrong) warnings
if(require("Rmpfr")) { ## Use high precision, notably large exponent range, numbers:
Bx <- besselJs(mpfr(x, 64), nu=200)
all.equal(Bx, bx, tol = 1e-15)# TRUE -- warnings were mostly wrong; specifically:
cbind(bx, Bx)
signif(asNumeric(1 - (bx/Bx)[19:21]), 4) # only [19] had lost accuracy
## With*out* mpfr numbers -- using log -- is accurate (here)
lbx <- besselJs( x, nu=200, log=TRUE)
lBx <- besselJs(mpfr(x, 64), nu=200, log=TRUE)
cbind(x, lbx, lBx)
stopifnot(all.equal(asNumeric(log(Bx)), lbx, tol=1e-15),
all.equal(lBx, lbx, tol=4e-16))
} # Rmpfr