| mulnos {timsac} | R Documentation |
Compute relative power contributions in differential and integrated form, assuming the orthogonality between noise sources.
mulnos(y, max.order=NULL, control=NULL, manip=NULL, h)
y |
a multivariate time series. |
max.order |
upper limit of model order. Default is 2*sqrt(n), where n is the length of time series |
control |
controlled variables. Default is c(1:d), where d is the dimension of the time series |
manip |
manipulated variables. Default number of manipulated variable is 0. |
h |
specify frequencies i/2 |
nperr |
a normalized prediction error covariance matrix. |
diffr |
differential relative power contribution. |
integr |
integrated relative power contribution. |
H.Akaike and T.Nakagawa (1988) Statistical Analysis and Control of Dynamic Systems. Kluwer Academic publishers.
ar <- array(0,dim=c(3,3,2))
ar[,,1] <- matrix(c(0.4, 0, 0.3,
0.2, -0.1, -0.5,
0.3, 0.1, 0),3,3,byrow=TRUE)
ar[,,2] <- matrix(c(0, -0.3, 0.5,
0.7, -0.4, 1,
0, -0.5, 0.3),3,3,byrow=TRUE)
x <- matrix(rnorm(200*3),200,3)
y <- mfilter(x,ar,"recursive")
mulnos(y, max.order=10, h=20)