| RMmqam {RandomFields} | R Documentation |
RMmqam is a multivariate stationary covariance model depending
on a submodel \phi such that
\psi(\cdot) := \phi(\sqrt(\cdot))
is completely monotone, and depending on further stationary
covariance models C_i. The covariance is given by
C_{ij}(h) = \phi(\sqrt(\theta_i (\phi^{-1}(C_i(h)))^2 + \theta_j (\phi^{-1}(C_j(h)))^2 ))
where \phi is a completely monotone function, C_i are
suitable covariance functions and \theta_i\ge0 such that
\sum_i \theta_i=1.
RMmqam(phi, C1, C2, C3, C4, C5, C6, C7, C8, C9, theta, var, scale, Aniso, proj)
phi |
a valid covariance |
C1, C2, C3, C4, C5, C6, C7, C8, C9 |
optional further stationary |
theta |
is a vector of values in |
var, scale, Aniso, proj |
optional arguments; same meaning for any |
Note that \psi(\cdot) := \phi(\sqrt(\cdot)) is completely monotone if and only if
\phi is a valid covariance function for all dimensions,
e.g. RMstable, RMgauss, RMexponential.
Warning: RandomFields cannot check whether the combination
of \phi and C_i is valid.
RMmqam returns an object of class RMmodel.
Martin Schlather, schlather@math.uni-mannheim.de, https://www.wim.uni-mannheim.de/schlather/
Porcu, E., Mateu, J. & Christakos, G. (2009) Quasi-arithmetic means of covariance functions with potential applications to space-time data. Journal of Multivariate Analysis, 100, 1830–1844.
RMqam,
RMmodel,
RFsimulate,
RFfit.
RFoptions(seed=0) ## *ANY* simulation will have the random seed 0; set
## RFoptions(seed=NA) to make them all random again
RFoptions(modus_operandi="sloppy")
model <- RMmqam(phi=RMgauss(),RMgauss(),RMexp(),theta=c(0.4, 0.6), scale=0.5)
x <- seq(0, 10, 0.02)
plot(model)
z <- RFsimulate(model=model, x=x)
plot(z)
RFoptions(modus_operandi="normal")