One point compactification and Lipschitz normally embedded definable subsets

Abstract

A closed subset of Rq, definable in some given o-minimal structure, is Lipschitz normally embedded in Rq if and only if its one-point compactification is Lipschitz normally embedded in the unit sphere Sq( = Rq \∞ \), i.e. the closure of its image by the inverse of the stereographic projection is Lipschitz normally embedded in Sq. This implies that any closed connected unbounded definable subset of an Euclidean space is definably inner bi-Lipschitz homeomorphic to a Lipschitz normally embedded definable set.