Totally Ramified Maximal Tori and Bruhat-Tits theory

Abstract

Suppose k is a nonarchimedean local field, K is a maximally unramified extension of k, and G is a connected reductive k-group. If T is a K-minisotropic maximal k-torus in G, then we use Bruhat-Tits theory to describe the stable classes in the G-orbit of T, the rational classes in the G-orbit of T, and the k-embeddings, up to rational conjugacy, into G of T. We also provide, via Bruhat-Tits theory, a complete and explicit description of: the rational conjugacy classes of K-minisotropic maximal tame k-tori in G; the stable classes of K-minisotropic maximal tame k-tori in G; and the k-embeddings, up to rational conjugacy, into G of a K-minisotropic maximal tame k-torus of G.