Chabauty limits of algebraic groups acting on trees

Abstract

Given a locally finite leafless tree T , various algebraic groups over local fields might appear as closed subgroups of Aut (T). We show that the set of closed cocompact subgroups of Aut (T) that are isomorphic to a quasi-split simple algebraic group is a closed subset of the Chabauty space of Aut (T). This is done via a study of the integral Bruhat-Tits model of SL2 and SU3L/K , that we carry on over arbitrary local fields, without any restriction on the (residue) characteristic. In particular, we show that in residue characteristic 2 , the Tits index of simple algebraic subgroups of Aut (T) is not always preserved under Chabauty limits.