Hearing Delzant polytopes from the equivariant spectrum

Abstract

Let M2n be a symplectic toric manifold with a fixed Tn-action and with a toric K\"ahler metric g. Abreu asked whether the spectrum of the Laplace operator g on C∞(M) determines the moment polytope of M, and hence by Delzant's theorem determines M up to symplectomorphism. We report on some progress made on an equivariant version of this conjecture. If the moment polygon of M4 is generic and does not have too many pairs of parallel sides, the so-called equivariant spectrum of M and the spectrum of its associated real manifold MR determine its polygon, up to translation and a small number of choices. For M of arbitrary even dimension and with integer cohomology class, the equivariant spectrum of the Laplacian acting on sections of a naturally associated line bundle determines the moment polytope of M.