What is the computational complexity of sampling from a multivariate normal distribution ?
Does the covariance matrix need to be inverted first, yielding a O(n^3) algorithm or there exists algorithms with complexity O(n^2) ?
What is the computational complexity of sampling from a multivariate normal distribution ? Does the covariance matrix need to be inverted first, yielding a O(n^3) algorithm or there exists algorithms with complexity O(n^2) ? 


If C is your covariance matrix, and C=LL^{T} is its Cholesky decomposition, then Lx would have the required covariance structure. Here, x is an nvector of standard normal variables. Cholesky decomposition takes O(n^3) time to compute. However, if you do it upfront and then just use L, you'll have amortized the cost across all the random samples you compute. 

