Two-dimensional Schr\"odinger operators with non-local singular potentials

Abstract

In this paper we introduce and study a family of self-adjoint realizations of the Laplacian in L2(R2) with a new type of transmission conditions along a closed bi-Lipschitz curve . These conditions incorporate jumps in the Dirichlet traces both of the functions in the operator domains and of their Wirtinger derivatives and are non-local. Constructing a convenient generalized boundary triple, they may be parametrized by all compact hermitian operators in L2(;C2). Whereas for all choices of parameters the essential spectrum is stable and equal to [0, +∞), the discrete spectrum exhibits diverse behaviour. While in many cases it is finite, we will describe also a class of parameters for which the discrete spectrum is infinite and accumulates at -∞. The latter class contains a non-local version of the oblique transmission conditions. Finally, we will connect the current model to its relativistic counterpart studied recently in [L. Heriban, M. Tusek: Non-local relativistic δ-shell interactions].

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