Inverse problems for differential forms on Riemannian manifolds with boundary

Abstract

Consider a real-analytic orientable connected complete Riemannian manifold M with boundary of dimension n 2 and let k be an integer 1 k n. In the case when M is compact of dimension n 3, we show that the manifold and the metric on it can be reconstructed, up to an isometry, from the set of the Cauchy data for harmonic k-forms, given on an open subset of the boundary. This extends a result of [13] when k=0. In the two-dimensional case, the same conclusion is obtained when considering the set of the Cauchy data for harmonic 1-forms. Under additional assumptions on the curvature of the manifold, we carry out the same program when M is complete non-compact. In the case n 3, this generalizes the results of [12] when k=0. In the two-dimensional case, we are able to reconstruct the manifold from the set of the Cauchy data for harmonic 1-forms.