Spectral Convergence of Large Block-Hankel Gaussian Random Matrices
Abstract
This paper studies the behaviour of the empirical eigenvalue distribution of large random matrices WN WN* where WN is a ML x N matrix, whose M block lines of dimensions L x N are mutually independent Hankel matrices constructed from complex Gaussian correlated stationary random sequences. In the asymptotic regime where M → ∞, N → +∞ and ML/N → c > 0, it is shown using the Stieltjes transform approach that the empirical eigenvalue distribution of WN WN* has a deterministic behaviour which is characterized.
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