Generating infinite monoids of cellular automata

Abstract

For a group G and a set A, let End(AG) be the monoid of all cellular automata over AG, and let Aut(AG) be its group of units. By establishing a characterisation of surjunctuve groups in terms of the monoid End(AG), we prove that the rank of End(AG) (i.e. the smallest cardinality of a generating set) is equal to the rank of Aut(AG) plus the relative rank of Aut(AG) in End(AG), and that the latter is infinite when G has an infinite decreasing chain of normal subgroups of finite index, condition which is satisfied, for example, for any infinite residually finite group. Moreover, when A=V is a vector space over a field F, we study the monoid EndF(VG) of all linear cellular automata over VG and its group of units AutF(VG). We show that if G is an indicable group and V is finite-dimensional, then EndF(VG) is not finitely generated; however, for any finitely generated indicable group G, the group AutF(FG) is finitely generated if and only if F is finite.