Milnor's isospectral tori and harmonic maps

Abstract

A well-known question asks whether the spectrum of the Laplacian on a Riemannian manifold (M,g) determines the Riemannian metric g up to isometry. A similar question is whether the energy spectrum of all harmonic maps from a given Riemannian manifold (,h) to M determines the Riemannian metric on the target space. We consider this question in the case of harmonic maps between flat tori. In particular, we show that the two isospectral, non-isometric 16-dimensional flat tori found by Milnor cannot be distinguished by the energy spectrum of harmonic maps from d-dimensional flat tori for d≤ 3, but can be distinguished by certain flat tori for d≥ 4. This is related to a property of the Siegel theta series in degree d associated to the 16-dimensional lattices in Milnor's example.