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Probabilistic Weyl Law for Twisted Toeplitz Matrices with Rough Symbols | Synapse

April 12, 2026Open Access

Probabilistic Weyl Law for Twisted Toeplitz Matrices with Rough Symbols

Key Points

Investigate the weak convergence behavior of empirical spectral measures for twisted Toeplitz matrices with rough symbols under random perturbations.
Analyzed twisted Toeplitz matrices with rough symbols
Examined the impact of small random perturbations
Used probability theory to assess convergence of spectral measures
Demonstrated weak convergence of the empirical spectral measure in probability
Showed that the limiting spectral measure corresponds to the push-forward of the Lebesgue measure
Identified conditions for smoothness and continuity in the symbol function

Abstract

In this article, we study the convergence of the empirical spectral measure of twisted Toeplitz matrices subject to small random perturbations. We show that the empirical spectral measure converges weakly in probability to the push-forward of the Lebesgue measure by the symbol. The symbol of the twisted Toeplitz matrices is assumed to be smooth in frequency, and only piecewise Hölder continuous with respect to the position variable with discontinuities of jump type.

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Cite This Study

Lucas Noël (Tue,) studied this question.

synapsesocial.com/papers/69db37df4fe01fead37c6018 https://doi.org/https://doi.org/10.48550/arxiv.2604.07370

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