Eigenvalue distribution of large sample covariance matrices of linear processes

Abstract

We derive the distribution of the eigenvalues of a large sample covariance matrix when the data is dependent in time. More precisely, the dependence for each variable i=1,...,p is modelled as a linear process (Xi,t)t=1,...,n=(Σj=0∞ cj Zi,t-j)t=1,...,n, where \Zi,t\ are assumed to be independent random variables with finite fourth moments. If the sample size n and the number of variables p=pn both converge to infinity such that y=n∞n/pn>0, then the empirical spectral distribution of p-1T converges to a nonrandom distribution which only depends on y and the spectral density of (X1,t)t∈. In particular, our results apply to (fractionally integrated) ARMA processes, which we illustrate by some examples.