English

Non-compact quantum graphs with summable matrix potentials

Spectral Theory 2021-02-24 v1

Abstract

Let G\mathcal{G} be a metric noncompact connected graph with finitely many edges. The main object of the paper is the Hamiltonian Hα{\bf H}_{\alpha} associated in L2(G;Cm)L^2(\mathcal{G};\mathbb{C}^m) with a matrix Sturm-Liouville expression and boundary delta-type conditions at each vertex. Assuming that the potential matrix is summable and applying the technique of boundary triplets and the corresponding Weyl functions, we show that the singular continuous spectrum of the Hamiltonian Hα{\bf H}_{\alpha} as well as any other self-adjoint realization of the Sturm-Liouville expression is empty. We also indicate conditions on the graph ensuring pure absolute continuity of the positive part of Hα{\bf H}_{\alpha}. Under an additional condition on the potential matrix, a Bargmann-type estimate for the number of negative eigenvalues of Hα{\bf H}_{\alpha} is obtained. Additionally, for a star graph G\mathcal{G} a formula is found for the scattering matrix of the pair {Hα,HD}\{{\bf H}_{\alpha}, {\bf H}_D\}, where HD{\bf H}_D is the Dirichlet operator on G\mathcal{G}.

Keywords

Cite

@article{arxiv.2012.03097,
  title  = {Non-compact quantum graphs with summable matrix potentials},
  author = {Yaroslav Granovskyi and Mark Malamud and Hagen Neidhardt},
  journal= {arXiv preprint arXiv:2012.03097},
  year   = {2021}
}
R2 v1 2026-06-23T20:45:18.158Z