Local-to-Global-rigidity of lattices in SLn(K)

Abstract

A vertex-transitive graph G is called Local-to-Global rigid if there exists R>0 such that every other graph whose balls of radius R are isometric to the balls of radius R in G is covered by G. An example of such a graph is given by the Bruhat-Tits building of PSLn(K) with n≥ 4 and K a non-Archimedean local field of characteristic zero.. In this paper we extend this rigidity property to a class of graphs quasi-isometric to the building including torsion-free lattices of SLn(K). The demonstration is the occasion to prove a result on the local structure of the building. We show that if we fix a PSLn(K)-orbit in it, then a vertex is uniquely determined by the neighbouring vertices in this orbit.