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Main Author: Kivimae, Pax
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.07478
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author Kivimae, Pax
author_facet Kivimae, Pax
contents We study the moments of the absolute characteristic polynomial of the real elliptic ensemble, including the case of the real Ginibre ensemble. We obtain asymptotics for all integral moments inside the real bulk to order 1 + o(1). In particular, for the real Ginibre ensemble, this extends known computations for even moments, and confirms a recent conjecture of Serebryakov and Simm [48] in the integral case. For the elliptic case, this generalizes computations of first two moments by Fyodorov [25] and Fyodorov and Tarnowski [31]. We additionally find uniform asymptotics for the multi-point correlations of the absolute characteristic polynomial. Our proof relies on a relation between expectations for the absolute characteristic polynomial and the real correlation functions, as well as an algebraic method of obtaining asymptotics for the behavior of these correlation functions near the diagonal.
format Preprint
id arxiv_https___arxiv_org_abs_2410_07478
institution arXiv
publishDate 2024
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spellingShingle Moments of Characteristic Polynomials of Non-Symmetric Random Matrices
Kivimae, Pax
Probability
Mathematical Physics
We study the moments of the absolute characteristic polynomial of the real elliptic ensemble, including the case of the real Ginibre ensemble. We obtain asymptotics for all integral moments inside the real bulk to order 1 + o(1). In particular, for the real Ginibre ensemble, this extends known computations for even moments, and confirms a recent conjecture of Serebryakov and Simm [48] in the integral case. For the elliptic case, this generalizes computations of first two moments by Fyodorov [25] and Fyodorov and Tarnowski [31]. We additionally find uniform asymptotics for the multi-point correlations of the absolute characteristic polynomial. Our proof relies on a relation between expectations for the absolute characteristic polynomial and the real correlation functions, as well as an algebraic method of obtaining asymptotics for the behavior of these correlation functions near the diagonal.
title Moments of Characteristic Polynomials of Non-Symmetric Random Matrices
topic Probability
Mathematical Physics
url https://arxiv.org/abs/2410.07478