On the 3-colorable subgroup F and maximal subgroups of Thompson's group F

Abstract

In his work on representations of Thompson's group F, Vaughan Jones defined and studied the 3-colorable subgroup F of F. Later, Ren showed that it is isomorphic with the Brown-Thompson group F4. In this paper we continue with the study of the 3-colorable subgroup and prove that the quasi-regular representation of F associated with the 3-colorable subgroup is irreducible. We show moreover that the preimage of F under a certain injective endomorphism of F is contained in three (explicit) maximal subgroups of F of infinite index. These subgroups are different from the previously known infinite index maximal subgroups of F, namely the parabolic subgroups that fix a point in (0,1), (up to isomorphism) the Jones' oriented subgroup F, and the explicit examples found by Golan.