Brian C. Hall
Published 2019-10-21Version 1
This article begins with a brief review of random matrix theory, followed by a discussion of how the large-$N$ limit of random matrix models can be realized using operator algebras. I then explain the notion of "Brown measure," which play the role of the eigenvalue distribution for operators in an operator algebra. I then show how methods of partial differential equations can be used to compute Brown measures. I consider in detail the case of the circular law and then discuss more briefly the case of the free multiplicative Brownian motion, which was worked out recently by the author with Driver and Kemp.
Comments: 39 pages, 20 figures. Submitted to Springer volume on "Harmonic Analysis and Applications"
Brown measures of deformed $L^\infty$-valued circular elements
The Brown measure of the sum of a self-adjoint element and an imaginary multiple of a semicircular element
Subcritical multiplicative chaos for regularized counting statistics from random matrix theory
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