Beyond the Lascar Group

Abstract

We work in a first-order setting where structures are spread out over a metric space, with quantification allowed only over bounded subsets. Assuming a doubling property for the metric space, we define a canonical core J associated to such a theory, a locally compact structure that embeds into the type space over any model. The automorphism group of J, modulo certain infinitesimal automorphisms, is a locally compact group G. The automorphism groups of models of the theory are related with G, not in general via a homomorphism, but by a quasi-homomorphism, respecting multiplication up to a certain canonical compact error set. This fundamental structure is applied to describe the nature of approximate subgroups. Specifically we obtain a full classification of (properly) approximate lattices of SLn(R) or SLn(Qp).