No Eigenvalues Outside the Support of the Limiting Spectral Distribution of Large Dimensional noncentral Sample Covariance Matrices

Abstract

Let n =1n(n + 1/2n n)(n + 1/2n n)* , where n is a p × n matrix with independent standardized random variables, n is a p × n non-random matrix and n is a p × p non-random, nonnegative definite Hermitian matrix. The matrix n is referred to as the information-plus-noise type matrix, where n contains the information and 1/2n n is the noise matrix with the covariance matrix n . It is known that, as n ∞ , if p/n converges to a positive number, the empirical spectral distribution of n converges almost surely to a nonrandom limit, under some mild conditions. In this paper, we prove that, under certain conditions on the eigenvalues of n and n , for any closed interval outside the support of the limit spectral distribution, with probability one there will be no eigenvalues falling in this interval for all n sufficiently large.