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Autore principale: Haeming, Lian
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2407.14233
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author Haeming, Lian
author_facet Haeming, Lian
contents We study the non-Hermitian Anderson model on the ring. We provide the exact rate of decay of the sensitivity of the eigenvalues to the non-Hermiticity parameter $g$, on the logarithmic scale, as the Lyapunov exponent minus the non-Hermiticity parameter. Namely, for $0 < g < γ(λ_{0})$ we show that $-\frac{1}{n}\log|λ_{g}-λ_{0}|\sim γ(λ_{0})-g$ and that the eigenvalue remains real for all such $g$. This provides an alternative proof to that of Goldsheid and Sodin that the perturbed eigenvalue remains real and specifies the exact rate at which the eigenvalue is exponentially close to the unperturbed eigenvalue.
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institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On the Real Eigenvalues of the Non-Hermitian Anderson Model
Haeming, Lian
Spectral Theory
We study the non-Hermitian Anderson model on the ring. We provide the exact rate of decay of the sensitivity of the eigenvalues to the non-Hermiticity parameter $g$, on the logarithmic scale, as the Lyapunov exponent minus the non-Hermiticity parameter. Namely, for $0 < g < γ(λ_{0})$ we show that $-\frac{1}{n}\log|λ_{g}-λ_{0}|\sim γ(λ_{0})-g$ and that the eigenvalue remains real for all such $g$. This provides an alternative proof to that of Goldsheid and Sodin that the perturbed eigenvalue remains real and specifies the exact rate at which the eigenvalue is exponentially close to the unperturbed eigenvalue.
title On the Real Eigenvalues of the Non-Hermitian Anderson Model
topic Spectral Theory
url https://arxiv.org/abs/2407.14233