Embeddings of local fields in simple algebras and simplicial structures on the Bruhat-Tits building

Abstract

This article answers a question that naturally arises from the articles by Grabitz and Broussous "Pure elements and intertwining classes of simple strata in local central simple algebras" and Broussous and Lemaire "Buildings of GL(m,D) and Centralizers". For an Azumaya-Algebra A over a non-Archimedean local field F, Grabitz and Broussous have introduced embedding invariants for field embeddings, that is for pairs (E,a), where E is a field extension of F in A, and a is a hereditary order which is normalised by Ex. On the other hand if we take such a field extension E and define B to be the centralizer of E in A, then G:=Ax and GE:=Bx are sets of rational points of reductive groups defined over F and E respectively. Broussous and Lemaire have defined a map jE: IEx IE, where I is the the Euclidean building of G, and IE is the Euclidean building of GE. The question which we address is to relate the embedding invariants to the behavior of the map jE with respect to the simplicial structures of I and IE. I have to thank very much Prof. Zink from Homboldt University Berlin for his helpful remarks, the revision of the work and for giving my the interesting task.