Spectral minimal partitions of unbounded metric graphs

IF 1 3区数学 Q1 MATHEMATICS

Journal of Spectral Theory Pub Date : 2023-09-20 DOI:10.4171/jst/462

Matthias Hofmann, James Kennedy, Andrea Serio

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Abstract

We investigate the existence or non-existence of spectral minimal partitions of unbounded metric graphs, where the operator applied to each of the partition elements is a Schrödinger operator of the form $-\Delta + V$ with suitable (electric) potential $V$, which is taken as a fixed, underlying function on the whole graph. We show that there is a strong link between spectral minimal partitions and infimal partition energies on the one hand, and the infimum $\Sigma$ of the essential spectrum of the corresponding Schrödinger operator on the whole graph on the other. Namely, we show that for any $k\in\mathbb{N}$, the infimal energy among all admissible $k$-partitions is bounded from above by $\Sigma$, and if it is strictly below $\Sigma$, then a spectral minimal $k$-partition exists. We illustrate our results with several examples of existence and non-existence of minimal partitions of unbounded and infinite graphs, with and without potentials. The nature of the proofs, a key ingredient of which is a version of the characterization of the infimum of the essential spectrum known as Persson’s theorem for quantum graphs, strongly suggests that corresponding results should hold for Schrödinger operator-based partitions of unbounded domains in Euclidean space.

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无界度量图的谱最小分割

我们研究了无界度量图的谱最小分割的存在与否，其中应用于每个分割元素的算子是一个Schrödinger算子，其形式为$-\Delta + V$，具有合适的(电)势$V$，它被视为整个图上的固定的底层函数。一方面，我们证明了谱最小分割和最小分割能量之间有很强的联系，另一方面，在整个图上对应的Schrödinger算子的本质谱的最小$\Sigma$之间有很强的联系。也就是说，我们证明了对于任何$k\in\mathbb{N}$，所有允许的$k$ -分区之间的最小能量由$\Sigma$从上到下有界，如果它严格低于$\Sigma$，则存在谱极小$k$ -分区。我们用几个无界图和无限图的最小分割的存在性和不存在性的例子来说明我们的结果。这些证明的本质(其中一个关键成分是量子图的Persson定理)强烈地表明，相应的结果应该适用于Schrödinger欧几里得空间中无界域的基于算子的分区。

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来源期刊

Journal of Spectral Theory MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.00

自引率

0.00%

发文量

期刊介绍： The Journal of Spectral Theory is devoted to the publication of research articles that focus on spectral theory and its many areas of application. Articles of all lengths including surveys of parts of the subject are very welcome. The following list includes several aspects of spectral theory and also fields which feature substantial applications of (or to) spectral theory. Schrödinger operators, scattering theory and resonances; eigenvalues: perturbation theory, asymptotics and inequalities; quantum graphs, graph Laplacians; pseudo-differential operators and semi-classical analysis; random matrix theory; the Anderson model and other random media; non-self-adjoint matrices and operators, including Toeplitz operators; spectral geometry, including manifolds and automorphic forms; linear and nonlinear differential operators, especially those arising in geometry and physics; orthogonal polynomials; inverse problems.