The comparison property of amenable groups

Abstract

Let a countable amenable group G act on a \ compact metric space X. For two clopen subsets A and B of X we say that A is subequivalent to B (we write A B), if there exists a finite partition A=i=1k Ai of A into clopen sets and there are elements g1,g2,…,gk in G such that g1( A1), g2( A2),…, gk( Ak) are disjoint subsets of B. We say that the action admits comparison if for any clopen sets A, B, the condition, that for every G-invariant probability measure μ on X we have the sharp inequality μ( A)<μ( B), implies A B. Comparison has many desired consequences for the action, such as the existence of tilings with arbitrarily good Flner properties, which are factors of the action. Also, the theory of symbolic extensions, known for z-actions, extends to actions which admit comparison. We also study a purely group-theoretic notion of comparison: if every action of G on any zero-dimensional compact metric space admits comparison then we say that G has the comparison property. Classical groups z and zd enjoy the comparison property, but in the general case the problem remains open. In this paper we prove this property for groups whose every finitely generated subgroup has subexponential growth.