RMlgd: Local-Global Distinguisher Family Covariance Model
Description
RMlgd is a stationary isotropic covariance model, which is valid only for dimensions
$d =1,2$.
The corresponding covariance function only depends on the distance $r \ge 0$ between
two points and is given by
$$C(r) =1 - \beta^{-1}(\alpha + \beta)r^{\alpha} 1_{[0,1]}(r) + \alpha^{-1}(\alpha + \beta)r^{-\beta} 1_{r>1}(r)$$
where $\beta >0$ and $0 < \alpha \le (3-d)/2$,
with $d$ denoting the dimension of the random field.
Usage
RMlgd(alpha, beta, var, scale, Aniso, proj)
Arguments
alpha
parameter whose range is dependend on the dimension of the random field: $0< \alpha \le (3-d)/2$.
beta
beta > 0.
var,scale,Aniso,proj
optional parameters; same meaning for any
RMmodel. If not passed, the above
covariance function remains unmodified.
This model admits simulating random fields where RFfractaldimension
D of the Gaussian sample and Hurst coefficient H
can be chosen independently (compare also RMgencauchy.):
Here, the random field has RFfractaldimension $$D = d+1 - \alpha/2$$ and Hurst coefficient $$H = 1-\beta/2$$ for $0< \beta \le 1$.
References
Gneiting, T. and Schlather, M. (2004)
Stochastic models which separate RFfractaldimension and Hurst effect.SIAM review46, 269--282.