G-Compactness and Groups

Abstract

Lascar described EKP as a composition of EL and the topological closure of EL. We generalize this result to some other pairs of equivalence relations. Motivated by an attempt to construct a new example of a non-G-compact theory, we consider the following example. Assume G is a group definable in a structure M. We define a structure M0 consisting of M and X as two sorts, where X is an affine copy of G and in M0 we have the structure of M and the action of G on X. We prove that the Lascar group of M0 is a semi-direct product of the Lascar group of M and G/GL. We discuss the relationship between G-compactness of M and M0. This example may yield new examples of non-G-compact theories.