Surfaces with Commuting Boundary Laplacian and Dirichlet-to-Neumann Map

Abstract

For M⊂ Rd≥ 3 a smooth, connected, compact d-dimensional submanifold with boundary, equipped with the standard metric, the Laplacian on ∂ M is known to commute with the corresponding Dirichlet-to-Neumann map if and only if M is a ball. In this paper, we investigate the d=2 case and show that, surprisingly, there exists a one-parameter family of submanifolds of R2 as above for which the boundary Laplacian and the Dirichlet-to-Neumann map commute, thus answering an open problem posed by Girouard, Karpukhin, Levitin, and Polterovich. We then classify all such Riemannian surfaces of genus 0 or whose boundary has k≥ 3 connected components.

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