An unitary invariant of semi-bounded operator and its application to inverse problems

Abstract

Let L0 be a closed densely defined symmetric semi-bounded operator with nonzero defect indexes in a separable Hilbert space H. With L0 we associate a metric space L0 that is named a wave spectrum and constructed from trajectories \u(t)\t ≥ 0 of a dynamical system governed by the equation utt+(L0)*u=0. The wave spectrum is introduced through a relevant von Neumann operator algebra associated with the system. Wave spectra of unitary equivalent operators are isometric. In inverse problems on unknown manifolds, 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. By this, one can recover the manifold by the scheme "the 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) based on relations of inverse problems to system and control theory.