Stability of Gel'fand's inverse interior spectral problem for Schr\"odinger operators

Abstract

We study Gel'fand's inverse interior spectral problem of determining a closed Riemannian manifold (M,g) and a potential function q from the knowledge of the eigenvalues λj of the Schr\"odinger operator -g + q and the restriction of the eigenfunctions φj|U on a given open subset U⊂ M, where g is the Laplace-Beltrami operator on (M,g). We prove that an approximation of finitely many spectral data on U determines a finite metric space that is close to (M,g) in the Gromov-Hausdorff topology, and further determines a discrete function that approximates the potential q with uniform estimates. This leads to a quantitative stability estimate for the inverse interior spectral problem for Schr\"odinger operators in the general case.