Closed Image Characterizations of Locally Finite Groups via Cellular Automata

Abstract

We prove that a group G is locally finite if and only if, for some (equivalently, every) infinite set A, every cellular automaton AG AG has closed image in the prodiscrete topology. Equivalently, this holds if and only if every linear cellular automaton VG VG has closed image for some pair (K,V) with V infinite-dimensional over the field K (equivalently, for every such pair). This gives affirmative answers to Open Problems 6 and 7 of Ceccherini-Silberstein and Coornaert. More precisely, if G is not locally finite, then for every infinite set A there is a finite-memory cellular automaton AG AG with non-closed image, and for every field K and every infinite-dimensional K-vector space V there is such a linear cellular automaton VG VG. The common obstruction is constructed on a countable direct-sum alphabet from an infinite ray in a locally finite Cayley graph. A direct-summand argument gives arbitrary vector-space alphabets, while an alphabet-retract principle gives arbitrary infinite set alphabets.