RPbrmixed(phi, tcf, xi, mu, s, meshsize, lowerbound_optim,
vertnumber, optim_mixed, optim_mixed_tol, optim_mixed_maxp,
lambda, areamat, variobound) RPbrorig(phi, tcf, xi, mu, s)
RPbrshifted(phi, tcf, xi, mu, s)
RMmodel
;
specifies the covariance model to be simulated.phi
or
tcf
must be given.optim_mixed
if unknown. Default value is 1.RFoptions
RMmodel
xi
is always a number, i.e. $\xi$ is constant
in space. In contrast, $\mu$ and $s$ might be constant
numerical value or given a RMmodel
, in particular by a
RMtrend
model. The functions RPbrorig
, RPbrshifted
and RPbrmixed
simulate a Brown-Resnick process, which is defined by
$$Z(x) = \max_{i=1}^\infty X_i \exp(W_i(x) - \gamma^2),$$
where the $X_i$ are the points of a Poisson point process on the
positive real half-axis with intensity $x^{-2} dx$,
$W_i \sim W$ are iid centered Gaussian processes with
stationary increments and variogram $\gamma$ given by
model
. The functions correspond to the following ways of
simulation:
[object Object],[object Object],[object Object]
RFoptions(seed=0)
model <- RPbrshifted(RMfbm(alpha=1.5), xi=0)
z <- RFsimulate(model=model, 0:10, 0:10, grid=TRUE, n=4)
plot(z)
RFoptions(seed=NA)
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