A new method for bounding rates of convergence of empirical spectral distributions

Chatterjee, S. ; Bose, A. (2004) A new method for bounding rates of convergence of empirical spectral distributions Journal of Theoretical Probability, 17 (4). pp. 1003-1019. ISSN 0894-9840

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Official URL: http://www.springerlink.com/content/k3n7654481h873...

Related URL: http://dx.doi.org/10.1007/s10959-004-0587-9

Abstract

The probabilistic properties of eigenvalues of random matrices whose dimension increases indefinitely has received considerable attention. One important aspect is the existence and identification of the limiting spectral distribution (LSD) of the empirical distribution of the eigenvalues. When the LSD exists, it is useful to know the rate at which the convergence holds. The main method to establish such rates is the use of Stieltjes transform. In this article we introduce a new technique of bounding the rates of convergence to the LSD. We show how our results apply to specific cases such as the Wigner matrix and the Sample Covariance matrix.

Item Type:Article
Source:Copyright of this article belongs to Springer.
Keywords:Large Dimensional Random Matrix; Eigenvalues; Limiting Spectral Distribution; Marcenko-pastur Law; Semicircular Law; Wigner Matrix; Sample Variance Covariance Matrix; Toeplitz Matrix; Moment Method; Stieltjes Transform; Random Probability; Normal Approximation
ID Code:68663
Deposited On:05 Nov 2011 05:01
Last Modified:05 Nov 2011 05:01

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