The addition theorem for locally monotileable monoid actions

Abstract

We prove an instance of the so-called Addition Theorem for the algebraic entropy of actions of cancellative right amenable monoids S on discrete abelian groups A by endomorphisms, under the hypothesis that S is locally monotileable (that is, S admits a right F lner sequence (Fn)n∈ N such that Fn is a monotile of Fn+1 for every n∈ N). We study in details the class of locally monotileable groups, also in relation with already existing notions of monotileability for groups, introduced by Weiss and developed further by other authors recently.