Continuous isomorphisms between groups definable in o-minimal expansions of the real field

Abstract

In this paper we study the relation between the category of real Lie groups and that of groups definable in o-minimal expansions of the real field, which we will refer to as ``definable groups''. With this terminology, it is known (Pi88) that any definable group is a Lie group, and in COP a complete characterization of when a Lie group is Lie isomorphic to a definable group'' was given. We continue the analysis by explaining when a Lie isomorphism between definable groups is definable. Among other things, we generalize Wilkie's result on the o-minimality of the exponential function (Wilkie) by completely characterizing when, given an o-minimal expansion R of the real field and a Lie isomorphisms φ between two R-definable groups G1, G2, φ can be added to the language of R preserving o-minimality. We also prove that any definable group G can be endowed with an analytic manifold structure definable in RPfaff that makes it an analytic group.