Waveguides with combined Dirichlet and Robin boundary conditions

TL;DR

This paper investigates the spectral properties of the Laplacian in curved strips with mixed boundary conditions, establishing lower bounds and Hardy inequalities, and analyzing spectral stability under geometric variations.

Contribution

It introduces new spectral estimates and Hardy inequalities for Laplacians in curved strips with combined Dirichlet and Robin boundary conditions, extending previous stability results.

Findings

Spectral threshold estimated from below by eigenvalues of Dirichlet-Robin annulus.

Established Hardy-type inequality in infinite strips.

Proved spectral stability for Laplacian in curved strips with sign-changing curvature.

Abstract

We consider the Laplacian in a curved two-dimensional strip of constant width squeezed between two curves, subject to Dirichlet boundary conditions on one of the curves and variable Robin boundary conditions on the other. We prove that, for certain types of Robin boundary conditions, the spectral threshold of the Laplacian is estimated from below by the lowest eigenvalue of the Laplacian in a Dirichlet-Robin annulus determined by the geometry of the strip. Moreover, we show that an appropriate combination of the geometric setting and boundary conditions leads to a Hardy-type inequality in infinite strips. As an application, we derive certain stability of the spectrum for the Laplacian in Dirichlet-Neumann strips along a class of curves of sign-changing curvature, improving in this way an initial result of Dittrich and Kriz.