What are GT-shadows?

Abstract

Let B4 (resp. PB4) be the braid group (resp. the pure braid group) on 4 strands and NFIPB4(B4) be the poset whose objects are finite index normal subgroups of B4 that are contained in PB4. In this paper, we introduce GT-shadows which may be thought of as "approximations" to elements of the profinite version GT of the Grothendieck-Teichmueller group (see V. Drinfeld, Algebra i Analiz, 1990). We prove that GT-shadows form a groupoid whose objects are elements of NFIPB4(B4). We show that GT-shadows coming from elements of GT satisfy various additional properties and we investigate these properties. We establish an explicit link between GT-shadows and the group GT (see Theorem 3.8). We also present selected results of computer experiments on GT-shadows. In the appendix of this paper, we give a complete description of GT-shadows in the Abelian setting. We also prove that, in the Abelian setting, every GT-shadow comes from an element of GT. Objects very similar to GT-shadows were introduced in a paper by D. Harbater and L. Schneps in 1997. A variation of the concept of GT-shadows for the coarse version of GT was studied in papers by P. Guillot.