On groups with definable f-generics definable in p-adically closed fields

Abstract

The aim of this paper is to develop the theory of groups definable in the p-adic field Qp, with ``definable f-generics" in the sense of an ambient saturated elementary extension of Qp. We call such groups definable f-generic groups. So, by a ``definable f-generic'' or dfg group we mean a definable group in a saturated model with a global f-generic type which is definable over a small model. In the present context the group is definable over Qp, and the small model will be Qp itself. The notion of a dfg group is dual, or rather opposite to that of an fsg group (group with ``finitely satisfiable generics") and is a useful tool to describe the analogue of torsion free o-minimal groups in the p-adic context. In the current paper our group will be definable over Qp in an ambient saturated elementary extension K of Qp, so as to make sense of the notions of f-generic etc. In this paper we will show that every definable f-generic group definable in Qp is virtually isomorphic to a finite index subgroup of a trigonalizable algebraic group over Qp. This is analogous to the o-minimal context, where every connected torsion free group definable in R is isomorphic to a trigonalizable algebraic group (Lemma 3.4, COS). We will also show that every open definable f-generic subgroup of a definable f-generic group has finite index, and every f-generic type of a definable f-generic group is almost periodic, which gives a positive answer to the problem raised in P-Y of whether f-generic types coincide with almost periodic types in the p-adic case.