| RMhyperbolic {RandomFields} | R Documentation |
RMhyperbolic is a stationary isotropic covariance model
called “generalized hyperbolic”.
The corresponding covariance function only depends on the distance
r \ge 0 between two points and is given by
C(r) = \frac{(\delta^2+r^2)^{\nu/2}
K_\nu(\xi(\delta^2+r^2)^{1/2})}{\delta^\nu K_\nu(\xi
\delta)}
where K_{\nu} denotes the modified Bessel function of
second kind.
RMhyperbolic(nu, lambda, delta, var, scale, Aniso, proj)
nu, lambda, delta |
numerical values; should either satisfy |
var, scale, Aniso, proj |
optional arguments; same meaning for any
|
This class is over-parametrized, i.e. it can be reparametrized by
replacing the three parameters \lambda,
\delta and scale by two other parameters. This means
that the representation is not unique.
Each generalized hyperbolic covariance function is a normal scale mixture.
The model contains some other classes as special cases;
for \lambda = 0 we get the Cauchy covariance function
(see RMcauchy) with \gamma =
-\frac{\nu}2 and scale=\delta;
the choice \delta = 0 yields a covariance model of type
RMwhittle with smoothness parameter \nu
and scale parameter \lambda^{-1}.
RMhyperbolic returns an object of class RMmodel.
Martin Schlather, schlather@math.uni-mannheim.de, https://www.wim.uni-mannheim.de/schlather/
Shkarofsky, I.P. (1968) Generalized turbulence space-correlation and wave-number spectrum-function pairs. Can. J. Phys. 46, 2133-2153.
Barndorff-Nielsen, O. (1978) Hyperbolic distributions and distributions on hyperbolae. Scand. J. Statist. 5, 151-157.
Gneiting, T. (1997). Normal scale mixtures and dual probability densities. J. Stat. Comput. Simul. 59, 375-384.
RMcauchy,
RMwhittle,
RMmodel,
RFsimulate,
RFfit.
RFoptions(seed=0) ## *ANY* simulation will have the random seed 0; set
## RFoptions(seed=NA) to make them all random again
model <- RMhyperbolic(nu=1, lambda=2, delta=0.2)
x <- seq(0, 10, 0.02)
plot(model)
plot(RFsimulate(model, x=x))