| Square roots {RandomFields} | R Documentation |
Methods relying on square roots of the covariance matrix
RPdirect(phi, boxcox) RPsequential(phi, boxcox, back_steps, initial)
phi |
object of class |
boxcox |
the one or two parameters of the box cox transformation.
If not given, the globally defined parameters are used.
see |
back_steps |
Number of previous instances on which
the algorithm should condition.
If less than one then the number of previous instances
equals Default: |
initial |
First, N=(number of spatial points) * Default: |
RPdirect
is based on the well-known method for simulating
any multivariate Gaussian distribution, using the square root of the
covariance matrix. The method is pretty slow and limited to
about 8000 points, i.e. a 20x20x20 grid in three dimensions.
This implementation can use the Cholesky decomposition and
the singular value decomposition.
It allows for arbitrary points and arbitrary grids.
RPsequential
is programmed for spatio-temporal models
where the field is modelled sequentially in the time direction
conditioned on the previous k instances.
For k=5 the method has its limits for about 1000 spatial
points. It is an approximative method. The larger k the
better.
It also works for certain grids where the last dimension should
contain the highest number of grid points.
RPsequential returns an object of class RMmodel
Martin Schlather, schlather@math.uni-mannheim.de
Schlather, M. (1999) An introduction to positive definite functions and to unconditional simulation of random fields. Technical report ST 99-10, Dept. of Maths and Statistics, Lancaster University.
RFoptions(seed=0) ## *ANY* simulation will have the random seed 0; set ## RFoptions(seed=NA) to make them all random again model <- RMgauss(var=10, s=10) + RMnugget(var=0.01) plot(model, xlim=c(-25, 25)) z <- RFsimulate(model=RPdirect(model), 0:10, 0:10, n=4) plot(z)