Amenability and geometry of semigroups

TL;DR

This paper explores the relationship between amenability, F{46}lner conditions, and the geometry of finitely generated semigroups, establishing invariance properties and characterizations across broad classes.

Contribution

It demonstrates that left amenability coincides with the strong F{46}lner condition in many semigroup classes and introduces new characterizations and invariance results.

Findings

Left amenability coincides with the strong F{46}lner condition in broad semigroup classes.

F{46}lner condition is a left quasi-isometry invariant of finitely generated semigroups.

A new characterization of the strong F{46}lner condition via local injectivity.

Abstract

We study the connection between amenability, F{\o}lner conditions and the geometry of finitely generated semigroups. Using results of Klawe, we show that within an extremely broad class of semigroups (encompassing all groups, left cancellative semigroups, finite semigroups, compact topological semigroups, inverse semigroups, regular semigroups, commutative semigroups and semigroups with a left, right or two-sided zero element), left amenability coincides with the strong F{\o}lner condition. Within the same class, we show that a finitely generated semigroup of subexponential growth is left amenable if and only if it is left reversible. We show that the (weak) F{\o}lner condition is a left quasi-isometry invariant of finitely generated semigroups, and hence that left amenability is a left quasi-isometry invariant of left cancellative semigroups. We also give a new characterisation of the strong F{\o}lner condition, in terms of the existence of weak F{\o}lner sets satisfying a local injectivity condition on the relevant translation action of the semigroup.