GT-shadows for the gentle version of the Grothendieck-Teichmueller group

Abstract

Let B3 be the Artin braid group on 3 strands and PB3 be the corresponding pure braid group. In this paper, we construct the groupoid GTSh of GT-shadows for a (possibly more tractable) version GT0 of the Grothendieck-Teichmueller group GT introduced by D. Harbater and L. Schneps in 2000. We call this group the gentle version of GT and denote it by GTgen. The objects of GTSh are finite index normal subgroups N of B3 satisfying the condition N ⊂ PB3. Morphisms of GTSh are called GT-shadows and they may be thought of as approximations to elements of GTgen. We show how GT-shadows can be obtained from elements of GTgen and prove that GTgen is isomorphic to the limit of a certain functor defined in terms of the groupoid GTSh. Using this result, we get a criterion for identifying genuine GT-shadows.