On groups and counter automata
Group Theory
2012-05-16 v1
Abstract
We study finitely generated groups whose word problems are accepted by counter automata. We show that a group has word problem accepted by a blind n-counter automaton in the sense of Greibach if and only if it is virtually free abelian of rank n; this result, which answers a question of Gilman, is in a very precise sense an abelian analogue of the Muller-Schupp theorem. More generally, if G is a virtually abelian group then every group with word problem recognised by a G-automaton is virtually abelian with growth class bounded above by the growth class of G. We consider also other types of counter automata.
Cite
@article{arxiv.math/0611188,
title = {On groups and counter automata},
author = {Murray Elder and Mark Kambites and Gretchen Ostheimer},
journal= {arXiv preprint arXiv:math/0611188},
year = {2012}
}
Comments
18 pages