Spectral analysis of Dirac operators for dislocated potentials with a purely imaginary jump

arXiv - MATH - Spectral Theory Pub Date : 2024-09-10 DOI:arxiv-2409.06480

Lyonell Boulton, David Krejcirik, Tho Nguyen Duc

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Abstract

In this paper we present a complete spectral analysis of Dirac operators with non-Hermitian matrix potentials of the form $i\operatorname{sgn}(x)+V(x)$ where $V\in L^1$. For $V=0$ we compute explicitly the matrix Green function. This allows us to determine the spectrum, which is purely essential, and its different types. It also allows us to find sharp enclosures for the pseudospectrum and its complement, in all parts of the complex plane. Notably, this includes the instability region, corresponding to the interior of the band that forms the numerical range. Then, with the help of a Birman-Schwinger principle, we establish in precise manner how the spectrum and pseudospectrum change when $V\not=0$, assuming the hypotheses $\|V\|_{L^1}<1$ or $V\in L^1\cap L^p$ where $p>1$. We show that the essential spectra remain unchanged and that the $\varepsilon$-pseudospectrum stays close to the instability region for small $\varepsilon$. We determine sharp asymptotic for the discrete spectrum, whenever $V$ satisfies further conditions of decay at infinity. Finally, in one of our main findings, we give a complete description of the weakly-coupled model.

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具有纯虚跃迁的位错势的狄拉克算子谱分析

在本文中，我们对具有非赫米提矩阵势的狄拉克算子进行了完整的谱分析，其形式为 $i\operatorname{sgn}(x)+V(x)$ 其中$V/in L^1$。对于 $V=0$，我们明确计算矩阵格林函数。这使我们能够确定纯粹本质的频谱及其不同类型。它还允许我们在复平面的所有部分找到伪频谱及其补集的尖锐包围。值得注意的是，这包括不稳定区域，对应于构成数值范围的频带内部。然后，在比尔曼-施温格原理的帮助下，我们以精确的方式确定了在假设 $\|V\|_{L^1}1$ 时，当 $V\not=0$ 时频谱和伪频谱是如何变化的。我们的研究表明，基本谱保持不变，而且对于较小的 $\varepsilon$ 来说，$\varepsilon$-伪谱保持在不稳定区域附近。只要 $V$ 满足进一步的无穷衰减条件，我们就能确定离散谱的尖锐渐近线。最后，在我们的主要发现之一中，我们给出了弱耦合模型的完整描述。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Spectral Theory

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