The wave model of metric spaces

Abstract

Let be a metric space, At denote the metric neighborhood of the set A⊂ of the radius t; O be the lattice of open sets in with the partial order ⊂eq and the order convergence. The lattice of O-valued functions of t∈(0,∞) with the point-wise partial order and convergence contains the family I O=\A(·)\,|\,\,A(t)=At,\,\,A∈ O\. Let be the set of atoms of the order closure I O. We describe a class of spaces for which the set , equipped with an appropriate metric, is isometric to the original space . The space is the key element of the construction of the wave spectrum of a symmetric operator semi-bounded from below, which was introduced in a work of one of the authors. In that work, a program of constructing a functional model of operators of the aforementioned class was devised. The present paper is a step in realization of this program.