On sofic groups, Kaplansky's conjectures, and endomorphisms of pro-algebraic groups
Abstract
Let be a group. Let be a connected algebraic group over an algebraically closed field . Denote by the set of -points of . We study a class of endomorphisms of pro-algebraic groups, namely algebraic group cellular automata over . They are cellular automata whose local defining map is induced by a homomorphism of algebraic groups where is a finite memory set of . Our first result is that when is sofic, such an algebraic group cellular automaton is invertible whenever it is injective and . As an application, we prove that if is sofic and the group is commutative then the group ring , where is the endomorphism ring of , is stably finite. When is amenable, we show that an algebraic group cellular automaton is surjective if and only if it satisfies a weak form of pre-injectivity called -pre-injectivity. This yields an analogue of the classical Moore-Myhill Garden of Eden theorem. We also introduce the near ring which is as an additive group but the multiplication is induced by the group law of . The near ring contains naturally the group ring and we extend Kaplansky's conjectures to this new setting. Among other results, we prove that when is an orderable group, then all one-sided invertible elements of are trivial, i.e., of the form for some , , . This allows us to show that when is locally residually finite and orderable (e.g. or a free group), and , all injective algebraic cellular automata are of the form for all for some , , .
Cite
@article{arxiv.1804.06631,
title = {On sofic groups, Kaplansky's conjectures, and endomorphisms of pro-algebraic groups},
author = {Xuan Kien Phung},
journal= {arXiv preprint arXiv:1804.06631},
year = {2022}
}
Comments
Revised version