Full Mealy automata, complete square complexes, and anti-tori

Abstract

To a full m× n Mealy automaton A we associate a bijection θA, a one-vertex rank-two graph FθA, and a one-vertex VH-square complex YA tiled by mn Wang tiles. We prove that YA contains an anti-torus if and only if A is bi-reversible and FθA is aperiodic. The two hypotheses are independent and play disjoint roles: bi-reversibility is exactly what makes YA a complete square complex, so that its universal cover splits as a product of two trees and anti-tori can be discussed at all; and, within that setting, an anti-torus is precisely a period-free configuration in the two-sided path space of FθA, whose existence is the aperiodicity condition. Working at the level of configurations removes any appeal to the geometry of products of trees from the main equivalence; the geometric (loop-spanned) form of Wise is shown to be strictly stronger, the lamplighter being aperiodic with no loop-spanned anti-torus.