Chabauty Limits of Subgroups of SL(n, Qp)

Abstract

We study the Chabauty compactification of two families of closed subgroups of SL(n,Qp). The first family is the set of all parahoric subgroups of SL(n,Qp). Although the Chabauty compactification of parahoric subgroups is well studied, we give a different and more geometric proof using various Levi decompositions of SL(n,Qp). Let C be the subgroup of diagonal matrices in SL(n, Qp). The second family is the set of all SL(n,Qp)-conjugates of C. We give a classification of the Chabauty limits of conjugates of C using the action of SL(n,Qp) on its associated Bruhat--Tits building and compute all of the limits for n≤ 4 (up to conjugacy). In contrast, for n≥ 7 we prove there are infinitely many SL(n,Qp)-nonconjugate Chabauty limits of conjugates of C. Along the way we construct an explicit homeomorphism between the Chabauty compactification in sl(n, Qp) of SL(n,Qp)-conjugates of the p-adic Lie algebra of C and the Chabauty compactification of SL(n,Qp)-conjugates of C.