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Geometric Approximation of Point Interactions in Two-Dimensional Domains for Non-Self-Adjoint Operators

Author

Listed:
  • Denis Ivanovich Borisov

    (Institute of Mathematics, Ufa Federal Research Center of Russian Academy of Sciences, 450008 Ufa, Russia
    Faculty of Mathematics and IT Technologies, Ufa University of Science and Technology, 450076 Ufa, Russia)

Abstract

We define the notion of a point interaction for general non-self-adjoint elliptic operators in planar domains. We show that such operators can be approximated in a geometric way by cutting out a small cavity around the point, at which the interaction is concentrated. On the boundary of the cavity, we impose a special Robin-type boundary condition with a nonlocal term. As the cavity shrinks to a point, the perturbed operator converges in the norm resolvent sense to a limiting one with a point interaction containing an arbitrary prescribed complex-valued coupling constant. The mentioned convergence holds in a few operator norms, and for each of these norms we establish an estimate for the convergence rate. As a corollary of the norm resolvent convergence, we prove the convergence of the spectrum.

Suggested Citation

  • Denis Ivanovich Borisov, 2023. "Geometric Approximation of Point Interactions in Two-Dimensional Domains for Non-Self-Adjoint Operators," Mathematics, MDPI, vol. 11(4), pages 1-23, February.
    • Handle: RePEc:gam:jmathe:v:11:y:2023:i:4:p:947-:d:1066674
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