A unitary invariant of semi-bounded operator in reconstruction of manifolds

Abstract

With a densely defined symmetric semi-bounded operator of nonzero defect indexes L0 in a separable Hilbert space H we associate a topological space L0 ( wave spectrum) constructed from the reachable sets of a dynamical system governed by the equation utt+(L0)*u=0. Wave spectra of unitary equivalent operators are homeomorphic. In inverse problems, one needs to recover a Riemannian manifold via dynamical or spectral boundary data. We show that for a generic class of manifolds, is isometric to the wave spectrum L0 of the minimal Laplacian L0=-|C∞0( ∂ ) acting in H=L2(), whereas L0 is determined by the inverse data up to unitary equivalence. Hence, the manifold can be recovered (up to isometry) by the scheme `data ⇒ L0 ⇒ L0 isom= '. The wave spectrum is relevant to a wide class of dynamical systems, which describe the finite speed wave propagation processes. The paper elucidates the operator background of the boundary control method (Belishev`1986), which is an approach to inverse problems based on their relations to control theory.