RMfractdiff

optional arguments; same meaning for any
 <code><a rd-options="" href="/link/RMmodel?package=RandomFields&version=3.1.36" data-mini-rdoc="RandomFields::RMmodel">RMmodel</a></code>. If not passed, the above
 covariance function remains unmodified.

var,scale,Aniso,proj


 <code><a rd-options="" href="/link/RMfractdiff?package=RandomFields&version=3.1.36" data-mini-rdoc="RandomFields::RMfractdiff">RMfractdiff</a></code> is a stationary isotropic covariance model.
 The corresponding covariance function only depends on the distance
 $r \ge 0$ between two points and is given for integers
 $r$ by
 $$C(r) = (-1)^r \frac{ \Gamma(1-a/2)^2 }{ \Gamma(1-a/2+r) \Gamma(1-a/2-r) } r \in {\bf N}$$
 and otherwise linearly interpolated. Here $-1 \le a < 1$,
 $\Gamma$ denotes the gamma function.
 It can only be used for one-dimensional random fields.


models

spatial

Methods for the inference on and the simulation of Gaussian fields are provided, as well as methods for the simulation of extreme value random fields.

Martin Schlather

RandomFields

Simulation and Analysis of Random Fields

RMfractdiff function

optional arguments; same meaning for any
 <code><a rd-options='' href='RMmodel'>RMmodel</a></code>. If not passed, the above
 covariance function remains unmodified.


 <code><a rd-options='' href='RMfractdiff'>RMfractdiff</a></code> is a stationary isotropic covariance model.
 The corresponding covariance function only depends on the distance
 $r \ge 0$ between two points and is given for integers
 $r$ by
 $$C(r) = (-1)^r \frac{ \Gamma(1-a/2)^2 }{ \Gamma(1-a/2+r) \Gamma(1-a/2-r) } r \in {\bf N}$$
 and otherwise linearly interpolated. Here $-1 \le a < 1$,
 $\Gamma$ denotes the gamma function.
 It can only be used for one-dimensional random fields.


RMfractdiff: Fractionally Differenced Process Model

Description

Usage

Arguments

Value

Details

See Also

Examples