Hermitian, Non-Hermitian and Multivariate Finite Free Probability

Mirabelli, Benjamin

Please use this identifier to cite or link to this item: http://arks.princeton.edu/ark:/88435/dsp019593tz21r

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DC Field	Value	Language
dc.contributor.advisor	Marcus, Adam W
dc.contributor.author	Mirabelli, Benjamin
dc.contributor.other	Applied and Computational Mathematics Department
dc.date.accessioned	2021-06-10T17:38:17Z	-
dc.date.available	2021-06-10T17:38:17Z	-
dc.date.issued	2021
dc.identifier.uri	http://arks.princeton.edu/ark:/88435/dsp019593tz21r	-
dc.description.abstract	Finite free probability is a relatively new field that uses expected characteristic polynomials to study sums and products of unitarily invariant random matrices. In the first half of this dissertation we derive additive and multiplicative central limit theorems (CLTs) in finite free probability. We establish direct connections between these CLTs and CLTs in classical probability theory, random matrix theory, and free probability. We also define additive and multiplicative Brownian motions in finite free probability and relate them to point processes in statistical/quantum physics as well as to Brownian motions in classical probability theory, random matrix theory, and free probability. In the second half of this dissertation we introduce/define a new branch of finite free probability, which we call Multivariate/non-Hermitian finite free probability. We derive additive and multiplicative CLTs in Multivariate/non-Hermitian finite free probability and establish direct connections between these CLTs and CLTs in multivariate/complex classical probability theory, non-Hermitian random matrix theory, and multivariate/non-Hermitian free probability.
dc.language.iso	en
dc.publisher	Princeton, NJ : Princeton University
dc.relation.isformatof	The Mudd Manuscript Library retains one bound copy of each dissertation. Search for these copies in the library's main catalog: <a href=http://catalog.princeton.edu> catalog.princeton.edu </a>
dc.subject	Expected Characteristic Polynomial
dc.subject	Finite Free Probability
dc.subject	Free Probability
dc.subject	Non-Hermitian
dc.subject	Polynomial Convolutions
dc.subject	Random Matrices
dc.subject.classification	Applied mathematics
dc.subject.classification	Mathematics
dc.title	Hermitian, Non-Hermitian and Multivariate Finite Free Probability
dc.type	Academic dissertations (Ph.D.)
Appears in Collections:	Applied and Computational Mathematics

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