Field Embeddings which are conjugate under a unit of a p-adic classical Group

Abstract

Let (V,h) be a Hermitian space over a division algebra D which is of index at most two over a non-Archimedean local field k of residue characteristic not 2. Let G be the unitary group defined by h and let σ be the adjoint involution. Suppose we are given two σ-invariant but not σ-fixed field extensions E1 and E2 of k in EndD(V) which are isomorphic under conjugation by an element g of G and suppose that there is a point x in the Bruhat-Tits building of G which is fixed by the action of E1\0 and E2\0 on the reduced building of AutD(V). Then E1 is conjugate to E2 under an element of the stabilizer of x in G if E1 and E2 are conjugate under an element of the stabilizer of x in AutD(V) and a weak extra condition. In addition in many cases the conjugation by g from E1 to E2 can be realized as conjugation by an element of the stabilizer of x in G.