A characterization of compact operators via the non-connectedness of the attractors of a family of IFSs

Abstract

In this paper we present a result which establishes a connection between the theory of compact operators and the theory of iterated function systems. For a Banach space X, S and T bounded linear operators from X to X such that S , T <1 and w ∈ X, let us consider the IFS Sw=(X,f1,f2), where f1,f2:X → X are given by f1(x)=S(x) and f2(x)=T(x)+w, for all x ∈ X. On one hand we prove that if the operator S is compact, then there exists a family (Kn)n ∈ N of compact subsets of X such that ASw is not connected, for all w ∈ H- Kn. One the other hand we prove that if H is an infinite dimensional Hilbert space, then a bounded linear operator S:H → H having the property that S <1 is compact provided that for every bounded linear operator T:H→ H such that T <1 there exists a sequence (KT,n)n of compact subsets of H such that ASw is not connected for all w ∈ H- KT,n. Consequently, given an infinite dimensional Hilbert space H, there exists a complete characterization of the compactness of an operator S:H → H by means of the non-connectedness of the attractors of a family of IFSs related to the given operator.