Oscillating behaviour of the spectrum for a plasmonic problem in a domain with a rounded corner

TL;DR

This paper studies the eigenvalue problem in a domain with a rounded corner, revealing oscillatory eigenvalue behavior as the corner's rounding parameter approaches zero, with implications for plasmonic electromagnetic modeling.

Contribution

It provides an asymptotic expansion and error estimates for eigenvalues, explaining the oscillatory behavior caused by corner rounding in plasmonic problems.

Findings

Eigenvalues exhibit oscillations as the corner rounding parameter approaches zero.

Asymptotic expansion of eigenvalues is derived with error bounds.

Numerical experiments confirm the theoretical oscillatory behavior.

Abstract

We investigate the eigenvalue problem $-\text{div}(\sigma \nabla u) = \lambda u\ (\mathscr{P})$ in a 2D domain $\Omega$ divided into two regions $\Omega_{\pm}$. We are interested in situations where $\sigma$ takes positive values on $\Omega_{+}$ and negative ones on $\Omega_{-}$. Such problems appear in time harmonic electromagnetics in the modeling of plasmonic technologies. In a recent work [15], we highlighted an unusual instability phenomenon for the source term problem associated with $(\mathscr{P})$: for certain configurations, when the interface between the subdomains $\Omega_{\pm}$ presents a rounded corner, the solution may depend critically on the value of the rounding parameter. In the present article, we explain this property studying the eigenvalue problem $(\mathscr{P})$. We provide an asymptotic expansion of the eigenvalues and prove error estimates. We establish an oscillatory behaviour of the eigenvalues as the rounding parameter of the corner tends to zero. We end the paper illustrating this phenomenon with numerical experiments.