Non-Lie subgroups in Lie groups over local fields of positive characteristic

Abstract

By Cartan's Theorem, every closed subgroup H of a real (or p-adic) Lie group G is a Lie subgroup. For Lie groups over a local field K of positive characteristic, the analogous conclusion is known to be wrong. We show more: There exists a K-analytic Lie group G and a non-discrete, compact subgroup H such that, for every K-analytic manifold M, every K-analytic map f M G with f(M)⊂eq H is locally constant. In particular, the set H does not admit a non-discrete K-analytic manifold structure which makes the inclusion of H into G a K-analytic map. We can achieve that, moreover, H does not admit a K-analytic Lie group structure compatible with the topological group structure induced by G on H.