Wave model of the Sturm-Liouville operator on the half-line

Abstract

The notion of the wave spectrum of a semi-bounded symmetric operator was introduced by one of the authors in 2013. The wave spectrum is a topological space determined by the operator in a canonical way. The definition uses a dynamical system associated with the operator: the wave spectrum is constructed from its reachable sets. In the paper we give a description of the wave spectrum of the operator L0=-d2dx2+q which acts in the space L2(0,∞) and has defect indices (1,1). We construct a functional (wave) model of the operator L0* in which the elements of the original L2(0,∞) are realized as functions on the wave spectrum. It turns out to be identical to the original L0*. The latter is fundamental in solving inverse problems: the wave model is determined by their data, which allows for reconstruction of the original.