Von Neumann Regular Cellular Automata
Abstract
For any group and any set , a cellular automaton (CA) is a transformation of the configuration space defined via a finite memory set and a local function. Let be the monoid of all CA over . In this paper, we investigate a generalisation of the inverse of a CA from the semigroup-theoretic perspective. An element is von Neumann regular (or simply regular) if there exists such that and , where is the composition of functions. Such an element is called a generalised inverse of . The monoid itself is regular if all its elements are regular. We establish that is regular if and only if or , and we characterise all regular elements in when and are both finite. Furthermore, we study regular linear CA when is a vector space over a field ; in particular, we show that every regular linear CA is invertible when is torsion-free elementary amenable (e.g. when ) and , and that every linear CA is regular when is finite-dimensional and is locally finite with for all .
Keywords
Cite
@article{arxiv.1701.02692,
title = {Von Neumann Regular Cellular Automata},
author = {Alonso Castillo-Ramirez and Maximilien Gadouleau},
journal= {arXiv preprint arXiv:1701.02692},
year = {2017}
}
Comments
10 pages. Theorem 5 corrected from previous versions, in A. Dennunzio, E. Formenti, L. Manzoni, A.E. Porreca (Eds.): Cellular Automata and Discrete Complex Systems, AUTOMATA 2017, LNCS 10248, pp. 44-55, Springer, 2017