Robin spectral rigidity of strictly convex domains with a reflectional symmetry

Abstract

This is a note on a recent paper of De Simoi-Kaloshin-Wei DKW. We show that using their results combined with wave trace invariants of Guillemin-Melrose and the heat trace invariants of Zayed for the Laplacian with Robin boundary conditions, one can extend the Dirichlet/Neumann spectral rigidity results of DKW to the case of Robin boundary conditions. We will consider the same generic subset as in DKW of smooth strictly convex Z2-symmetric planar domains sufficiently close to a circle, however we pair them with arbitrary Z2-symmetric smooth Robin functions on the boundary and of course allow deformations of Robin functions as well.