Topological groups, μ-types and their stabilizers

Abstract

We consider an arbitrary topological group G definable in a structure M, such that some basis for the topology of G consists of sets definable in M. To each such group G we associate a compact G-space of partial types SμG(M)=\pμ:p∈ SG(M)\ which is the quotient of the usual type space SG(M) by the relation of two types being "infinitesimally close to each other". In the o-minimal setting, if p is a definable type then it has a corresponding definable subgroup Stabμ(p), which is the stabilizer of pμ. This group is nontrivial when p is unbounded in the sense of M; in fact it is a torsion-free solvable group. Along the way, we analyze the general construction of SμG(M) and its connection to the Samuel compactification of topological groups.