On the linearity of lattices in affine buildings and ergodicity of the singular Cartan flow

Abstract

Let X be a locally finite irreducible affine building of dimension ≥ 2 and ≤ Aut(X) be a discrete group acting cocompactly. The goal of this paper is to address the following question: When is linear? More generally, when does admit a finite-dimensional representation with infinite image over a commutative unital ring? If X is the Bruhat--Tits building of a simple algebraic group over a local field and if is an arithmetic lattice, then is clearly linear. We prove that if X is of type A2, then the converse holds. In particular, cocompact lattices in exotic A2-buildings are non-linear. As an application, we obtain the first infinite family of lattices in exotic A2-buildings of arbitrarily large thickness, providing also a partial answer to a question of W. Kantor from 1986. We also show that if X is Bruhat--Tits of arbitrary type, then the linearity of implies that is virtually contained in the linear part of the automorphism group of X, in particular is an arithmetic lattice. The proofs are based on the machinery of algebraic representations of ergodic systems recently developed by U. Bader and A. Furman. The implementation of that tool in the present context requires the geometric construction of a suitable ergodic -space attached to the the building X, which we call the singular Cartan flow.