Ergodicity of principal algebraic group actions

Abstract

An algebraic action of a discrete group is a homomorphism from to the group of continuous automorphisms of a compact abelian group X. By duality, such an action of is determined by a module M=X over the integer group ring Z of . The simplest examples of such modules are of the form M=Z /Z f with f∈ Z ; the corresponding algebraic action is the principal algebraic -action α f defined by f. In this note we prove the following extensions of results by Hayes Hayes on ergodicity of principal algebraic actions: If is a countably infinite discrete group which is not virtually cyclic, and if f∈Z satisfies that right multiplication by f on 2( ,R) is injective, then the principal -action α f is ergodic (Theorem t:ergodic2). If contains a finitely generated subgroup with a single end (e.g. a finitely generated amenable subgroup which is not virtually cyclic), or an infinite nonamenable subgroup with vanishing first 2-Betti number (e.g., an infinite property T subgroup), the injectivity condition on f can be replaced by the weaker hypothesis that f is not a right zero-divisor in Z (Theorem t:ergodic1). Finally, if is torsion-free, not virtually cyclic, and satisfies Linnell's analytic zero-divisor conjecture, then α f is ergodic for every f∈ Z (Remark r:analytic zero divisor).