On definable f-generic groups and minimal flows in p-adically closed fields
Abstract
Let X be a definable group definable over a small model M0. Recall that a global type p on X is definable f-generic over M0 if every left translate of p is definable over M0. We call p strongly f-generic over M0 if every left translate of p does not fork over M0. Let H be a group definable over the field Qp of p-adic numbers admitting global definable f-generic types over Qp. We show that H has unboundedly many global weakly generic types iff there is a global type r on H which is strongly f-generic over Qp and a Qp-definable function θ such that θ(r) is finitely satisfiable in Qp. Recall that the μ-type μ(x) on H is the partial type consisting of the formulas over Qp which define open neighborhoods of the identity of H. We show that every global weakly generic type r on H is μ-invariant: For any ε μ and a r, we have ε· a r. Let G be groups definable over Qp such that H is a normal subgroup of G and G/H is a definably compact group. Then we show that the weakly generic types on G coincide with almost periodic types G iff G has boundedly many global weakly generic types.
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