Hearing Exotic Smooth Structures: Basic Spectra of Equivariant Manifolds

This paper explores the existence and properties of basic eigenvalues and eigenfunctions associated with the Riemannian Laplacian on closed, connected Riemannian manifolds featuring an effective isometric action by a compact Lie group. We introduce the concept of equivariant isospectrality, asserting that two Riemannian manifolds with isometric actions by the same Lie group are equivariantly isospectral if their basic spectra coincide. Our primary focus is investigating the potential existence of homeomorphic yet not diffeomorphic smooth manifolds that can accommodate invariant, equivariantly isospectral metrics. We establish the occurrence of such scenarios for specific homotopy spheres and connected sums. Moreover, the developed theory demonstrates that the ring of invariant admissible scalar curvature functions on certain fixed smooth manifolds fails to distinguish between smooth structures. This implies the existence of homotopy spheres with identical rings of invariant scalar curvature functions, irrespective of the underlying smooth structure.