Sums of GUE matrices and concentration of hives from correlation decay of eigengaps
Author(s)
Narayanan, Hariharan; Sheffield, Scott; Tao, Terence
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Associated to two given sequences of eigenvalues λ 1 ≥ ⋯ ≥ λ n and μ 1 ≥ ⋯ ≥ μ n is a natural polytope, the polytope of augmented hives with the specified boundary data, which is associated to sums of random Hermitian matrices with these eigenvalues. As a first step towards the asymptotic analysis of random hives, we show that if the eigenvalues are drawn from the GUE ensemble, then the associated augmented hives exhibit concentration as n → ∞ . Our main ingredients include a representation due to Speyer of augmented hives involving a supremum of linear functions applied to a product of Gelfand–Tsetlin polytopes; known results by Klartag on the KLS conjecture in order to handle the aforementioned supremum; covariance bounds of Cipolloni–Erdős–Schröder of eigenvalue gaps of GUE; and the use of the theory of determinantal processes to analyze the GUE minor process.
Date issued
2023-12-28Department
Massachusetts Institute of Technology. Department of MathematicsJournal
Probability Theory and Related Fields
Publisher
Springer Berlin Heidelberg
Citation
Narayanan, H., Sheffield, S. & Tao, T. Sums of GUE matrices and concentration of hives from correlation decay of eigengaps. Probab. Theory Relat. Fields 190, 1121–1165 (2024).
Version: Author's final manuscript