Spectrum of the perturbed Landau-Dirac operator

arXiv - MATH - Spectral Theory Pub Date : 2024-09-12 DOI:arxiv-2409.08218
Vincent Bruneau, Pablo Miranda
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Abstract

In this article, we consider the Dirac operator with constant magnetic field in $\mathbb R^2$. Its spectrum consists of eigenvalues of infinite multiplicities, known as the Landau-Dirac levels. Under compactly supported perturbations, we study the distribution of the discrete eigenvalues near each Landau-Dirac level. Similarly to the Landau (Schr\"odinger) operator, we demonstrate that a three-terms asymptotic formula holds for the eigenvalue counting function. One of the main novelties of this work is the treatment of some perturbations of variable sign. In this context we explore some remarkable phenomena related to the finiteness or infiniteness of the discrete eigenvalues, which depend on the interplay of the different terms in the matrix perturbation.
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扰动朗道-狄拉克算子的频谱
在本文中,我们将考虑在 $\mathbb R^2$ 中具有恒定磁场的狄拉克算子。它的频谱由无穷倍率的特征值组成,称为兰道-狄拉克级。在紧凑支撑的扰动下,我们研究了每个兰道-狄拉克级附近离散特征值的分布。与朗道(薛定谔)算子类似,我们证明了特征值计数函数的三项渐近公式是成立的。这项工作的主要创新之一是处理一些符号可变的扰动。在此背景下,我们探索了一些与离散特征值的有限性或无限性有关的显著现象,这些现象取决于矩阵扰动中不同项的相互作用。
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arXiv - MATH - Spectral Theory
arXiv - MATH - Spectral Theory
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