matlab mvnrnd in gsl

Hi i'm not sure if my algorithm is correct i'm trying to replicate the mvnrnd function of matlab but in gsl. I found an algorithm in some journal articles that produces a vector of multivariate normal, but i need a matrix of multivariate normal random numbers

lets say the distribution is Z~(mu,sigma);

assuming sigma is a matrix already positive definite.

an algorithm i found off the web says to

``````1. cholskey(sigma) = A
2. generate uniform gaussian vector r
3. matrix vector triangular product with gsl_blas_dtrmv A * r
4. add mu to Ar and that will be a vector of multivariate normal random numbers
``````

my method below

are the following changes belowcorrect to product a Matrix of random variables

``````    1. cholskey(sigma) = A
2. generate uniform gaussian matrix R
3. matrix matrix scalar product AR
4. add mu to AR and that will be a matrix of multivariate normal random numbers
``````
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Yes, that is correct. See e.g. this Wikipedia entry on multivariate normal RNGs which has this section:

Drawing values from the distribution

A widely used method for drawing a random vector x from the N-dimensional multivariate normal distribution with mean vector μ and covariance matrix Σ works as follows:

1. Find any real matrix A such that A AT = Σ. When Σ is positive-definite, the Cholesky decomposition is typically used. [...]

2. Let z = (z1, …, zN)T be a vector whose components are N independent standard normal variates (which can be generated, for example, by using the Box–Muller transform).

3. Let x be μ + Az. This has the desired distribution due to the affine transformation property.

which describes the same algorithm.

There are also several implementations for R, for example `mvrnorm` in the MASS package which comes with every R installation.

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thanks! didn't think I would get some one famous like yourself to answer my question –  pyCthon May 2 '12 at 0:42