Generic differentiability and P-minimal groups
Abstract
We prove generic differentiability in P-minimal theories, strengthening an earlier result of Kuijpers and Leenknegt. Using this, we prove Onshuus and Pillay's P-minimal analogue of Pillay's conjectures on o-minimal groups. Specifically, let G be an n-dimensional definable group in a highly saturated model M of a P-minimal theory. Then there is an open definable subgroup H ⊂eq G such that H is compactly dominated by H/H00, and H/H00 is a p-adic Lie group of the expected dimension. Additionally, the generic differentiability theorem immediately implies a classification of interpretable fields in P-minimal theories, by work of Halevi, Hasson, and Peterzil.
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