Word problems and embedding-obstructions in cellular automata groups on groups
Abstract
We study groups of reversible cellular automata, or CA groups, on groups. More generally, we consider automorphism groups of subshifts of finite type on groups. It is known that word problems of CA groups on virtually nilpotent groups are in co-NP, and can be co-NP-hard. We show that under the Gap Conjecture of Grigorchuk, their word problems are PSPACE-hard on all other groups. On free and surface groups, we show that they are indeed always in PSPACE. On a group with co-NEXPTIME word problem, CA groups themselves have co-NEXPTIME word problem, and on the lamplighter group (which itself has polynomial-time word problem) we show they can be co-NEXPTIME-hard. We show also nonembeddability results: the group of cellular automata on a non-cyclic free group does not embed in the group of cellular automata on the integers (this solves a question of Barbieri, Carrasco-Vargas and Rivera-Burgos); and the group of cellular automata in dimension does not embed in a group of cellular automata in dimension if (this solves a question of Hochman).
Cite
@article{arxiv.2503.05572,
title = {Word problems and embedding-obstructions in cellular automata groups on groups},
author = {Ville Salo},
journal= {arXiv preprint arXiv:2503.05572},
year = {2025}
}
Comments
46 pages + 10 page appendix; changes in v3: We solves Hochman's problem completely. DAF is replaced with simpler and superior technology (ripple catching). Some other results are generalized; open problems section added; a notation index is added in appendix