Limiting Eigenvalue Behavior of a Class of Large Dimensional Random Matrices Formed From a Hadamard Product
Abstract
This paper investigates the strong limiting behavior of the eigenvalues of the class of matrices 1N(Dn Xn)(Dn Xn)*, studied in Girko 2001. Here, Xn=(xij) is an n× N random matrix consisting of independent complex standardized random variables, Dn=(dij), n× N, has nonnegative entries, and denotes Hadamard (componentwise) product. Results are obtained under assumptions on the entries of Xn and Dn which are different from those in Girko (2001), which include a Lindeberg condition on the entries of Dn Xn, as well as a bound on the average of the rows and columns of Dn Dn. The present paper separates the assumptions needed on Xn and Dn. It assumes a Lindeberg condition on the entries of Xn, along with a tigntness-like condition on the entries of Dn,
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