Inverse spectral problems on a closed manifold

Abstract

In this paper we consider two inverse problems on a closed connected Riemannian manifold (M,g). The first one is a direct analog of the Gel'fand inverse boundary spectral problem. To formulate it, assume that M is divided by a hypersurface into two components and we know the eigenvalues λj of the Laplace operator on (M,g) and also the Cauchy data, on , of the corresponding eigenfunctions φj, i.e. φj|,∂φj|, where is the normal to . We prove that these data determine (M,g) uniquely, i.e. up to an isometry. In the second problem we are given much less data, namely, λj and φj| only. However, if consists of at least two components, 1, 2, we are still able to determine (M,g) assuming some conditions on M and . These conditions are formulated in terms of the spectra of the manifolds with boundary obtained by cutting M along i, i=1,2, and are of a generic nature. We consider also some other inverse problems on M related to the above with data which is easier to obtain from measurements than the spectral data described.