Interpolation sets in spaces of continuous metric-valued functions

Abstract

Let X and M be a topological space and metric space, respectively. If C(X,M) denotes the set of all continuous functions from X to M, we say that a subset Y of X is an M-interpolation set if given any function g∈ MY with relatively compact range in M, there exists a map f∈ C(X,M) such that f|Y=g. In this paper, motivated by a result of Bourgain in Bourgain1977, we introduce a property, stronger than the mere non equicontinuity of a family of continuous functions, that isolates a crucial fact for the existence of interpolation sets in fairly general settings. As a consequence, we establish the existence of I0 sets in every nonprecompact subset of a abelian locally kω-groups. This implies that abelian locally kω-groups strongly respects compactness.