Rigidity of Commutative Non-hyperbolic Actions by Toral Automorphisms

Abstract

Berend gives necessary and sufficient conditions on a Zr-action α on a torus Td by toral automorphisms in order for every orbit be either finite or dense. One of these conditions is that on every common eigendirection of the Zr-action there is an element n ∈ Zr so that α n expands this direction. In this paper, we investigate what happens when this condition is removed; more generally, we consider a partial orbit \α n.x : n ∈ \ where is a set of elements which acts approximately as the identity on a given set of eigendirections. This analysis is used in an essential way in the work of the author with E. Lindenstrauss classifying topological self-joinings of maximal Zr-actions on tori for r≥ 3.