On groups definable in p-adically closed fields

Abstract

This paper is about the dfg/fsg decomposition for groups G definable in p-adically closed fields. It is proved that for G definably amenable, G has a definable normal dfg subgroup H such that the quotient G/H is a definable fsg group. The result was known for groups definable in o-minimal expansions of real closed fields (see C-P-o-mini). We also give a version for arbitrary (not necessarily definably amenable) groups G definable in p-adically closed fields: there is a definable dfg subgroup H of G such that the homogeneous space G/H is definable and definably compact. (In the o-minimal case this is Fact 3.25 of Peterzil-Starchenko-mutypes). Note that dfg stands for ``has a definable f-generic type", and fsg for ``has finitely satisfiable generics", which will be discussed together with various equivalences. We will need to understand something about groups of the form G(k) where k is a p-adically closed field and G a semisimple algebraic group over k, and as part of the analysis we will prove the Kneser-Tits conjecture over p-adically closed fields.