等边树图上狄拉克算子的安巴尔祖米扬定理

Pub Date : 2024-03-27 DOI:10.1007/s10255-024-1042-6

Dong-Jie Wu, Xin-Jian Xu, Chuan-Fu Yang

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引用次数: 0

摘要

经典的 Ambarzumyan 定理指出，如果在 [0, π] 上具有可积分实值势 q 的 Sturm-Liouville 算子 \( - {{{d^2}} \over {d{x^2}}} + q\) 的 Neumann 特征值为 {n2: n ≥ 0}，则几乎所有 x∈ [0, π] 的 q = 0。在这项工作中，经典的 Ambarzumyan 定理被扩展到等边树状图上的狄拉克算子。我们证明，如果图上狄拉克算子的谱与未扰动情况重合，那么势就同等于零。

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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Ambarzumyan’s Theorem for the Dirac Operator on Equilateral Tree Graphs

The classical Ambarzumyan’s theorem states that if the Neumann eigenvalues of the Sturm-Liouville operator \( - {{{d^2}} \over {d{x^2}}} + q\) with an integrable real-valued potential q on [0, π] are {n²: n ≥ 0}, then q = 0 for almost all x ∈ [0, π]. In this work, the classical Ambarzumyan’s theorem is extended to the Dirac operator on equilateral tree graphs. We prove that if the spectrum of the Dirac operator on graphs coincides with the unperturbed case, then the potential is identically zero.

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