standard.matrix: Standardization of a matrix of support points on the basis of a vector of probabilities
Description
Given a matrix of support points X and a corresponding vector of probabilities piv
it computes the mean for each dimension, the variance covariance matrix, the correlation matrix,
Spearman correlation matrix, and the standarized matrix Y
Usage
standard.matrix(X,piv)
Value
mu
vector of the means
V
variance-covariance matrix
si2
vector of the variances
si
vector of standard deviations
Cor
Braives-Pearson correlation matrix
Sper
Spearman correlation matrix
Y
matrix of standardized support points
Arguments
X
matrix of support points for the distribution included row by row
piv
vector of probabilities with the same number of elements as the rows of X
Author
Francesco Bartolucci, Silvia Bacci, Michela Gnaldi - University of Perugia (IT)
## Example of standardization of a randomly generated distributionX = matrix(rnorm(100),20,5)
piv = runif(20); piv = piv/sum(piv)
out = standard.matrix(X,piv)