Limiting Spectral Distributions of Families of Block Matrix Ensembles

Teresa Dunn; Henry Fleischmann; Faye Jackson; Simran Khunger; Steven Miller; Luke Reifenberg; Alexander Shashkov; Stephen Willis

doi:10.46787/pump.v5i0.2880

Limiting Spectral Distributions of Families of Block Matrix Ensembles

Authors

Teresa Dunn University of California, Davis
Henry L. Fleischmann University of Michigan
Faye Jackson University of Michigan
Simran Khunger Carnegie Mellon University
Steven J. Miller Williams College
Luke Reifenberg University of Notre Dame
Alexander Shashkov Williams College
Stephen Willis Williams College

DOI:

https://doi.org/10.46787/pump.v5i0.2880

Keywords:

random matrix theory; block matrices; Rayleigh distribution; method of moments; Hankel matrices

Abstract

We introduce a new matrix operation on a pair of matrices, sw(A,X), and discuss its implications on the limiting spectral distribution. In a special case, the resultant ensemble converges almost surely to the Rayleigh distribution. In proving this, we provide a novel combinatorial proof that the random matrix ensemble of circulant Hankel matrices converges almost surely to the Rayleigh distribution, using the method of moments.

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Published

2022-06-08

How to Cite

Dunn, T., Fleischmann, H., Jackson, F., Khunger, S., Miller, S., Reifenberg, L., … Willis, S. (2022). Limiting Spectral Distributions of Families of Block Matrix Ensembles. The PUMP Journal of Undergraduate Research, 5, 122–147. https://doi.org/10.46787/pump.v5i0.2880

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Issue

Vol. 5 (2022): PUMP Journal of Undergraduate Research

Section

Articles

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The author(s) will retain the copyright, but by submitting the article agree to grant permission to the PUMP Journal of Undergraduate Research to publish, distribute, and archive the article. The author(s) will acknowledge prior publication in the PUMP Journal of Undergraduate Research for all future uses of the article or parts of it.