The generation problem in Thompson group $F$
Abstract
We show that the generation problem in Thompson group is decidable, i.e., there is an algorithm which decides if a finite set of elements of generates the whole . The algorithm makes use of the Stallings -core of subgroups of , which can be defined in an analogue way to the Stallings core of subgroups of a finitely generated free group. Further study of the Stallings -core of subgroups of provides a solution to another algorithmic problem in . Namely, given a finitely generated subgroup of , it is decidable if acts transitively on the set of finite dyadic fractions . Other applications of the study include the construction of new maximal subgroups of of infinite index, among which, a maximal subgroup of infinite index which acts transitively on the set and the construction of an elementary amenable subgroup of which is maximal in a normal subgroup of .
Cite
@article{arxiv.1608.02572,
title = {The generation problem in Thompson group $F$},
author = {Gili Golan},
journal= {arXiv preprint arXiv:1608.02572},
year = {2021}
}
Comments
85 pages, final version, to appear in Memoirs of the AMS