Dimension inequality for a definably complete uniformly locally o-minimal structure of the second kind

Abstract

Consider a definably complete uniformly locally o-minimal expansion of the second kind of a densely linearly ordered abelian group. Let f:X → Rn be a definable map, where X is a definable set and R is the universe of the structure. We demonstrate the inequality (f(X)) ≤ (X) in this paper. As a corollary, we get that the set of the points at which f is discontinuous is of dimension smaller than (X). We also show that the structure is defiably Baire in the course of the proof of the inequality.