Weak heirs, coheirs and the Ellis semigroups

Abstract

Assume G H are groups and A⊂eq P(G),\ B⊂eq P(H) are algebras of sets closed under left group translation. Under some additional assumptions we find algebraic connections between the Ellis [semi]groups of the G-flow S( A) and the H-flow S( B). We apply these results in the model theoretic context. Namely, assume G is a group definable in a model M and M* N. Using weak heirs and weak coheirs we point out some algebraic connections between the Ellis semigroups Sext,G(M) and Sext,G(N). Assuming every minimal left ideal in Sext,G(N) is a group we prove that the Ellis groups of Sext,G(M) are isomorphic to closed subgroups of the Ellis groups of Sext,G(N).