Accessing non-abelian quotients of the Grothendieck-Teichmueller group via elementary tools
Abstract
Many challenging questions about the Grothendieck-Teichmueller group, GT, are motivated by the fact that this group receives the injective homomorphism (called the Ihara embedding) from the absolute Galois group, GQ, of rational numbers. Although the question about the surjectivity of the Ihara embedding is a very challenging problem, in this paper, we construct a family of finite non-abelian quotients of GT that receive surjective homomorphisms from GQ. We also assemble these finite quotients into an infinite (non-abelian) profinite quotient of GT. We prove that the natural homomorphism from GQ to the resulting profinite group is also surjective. We give an explicit description of this profinite group. To achieve these goals, we used the groupoid GTSh of GT-shadows for the gentle version of the Grothendieck-Teichmueller group. This groupoid was introduced in the recent paper by the second author and J. Guynee and the set Ob(GTSh) of objects of GTSh is a poset of certain finite index normal subgroups of the Artin braid group on 3 strands. We introduce a sub-poset Dih of Ob(GTSh) related to the family of dihedral groups and call it the dihedral poset. We show that each element K of Dih is the only object of its connected component in GTSh. Using the surjectivity of the cyclotomic character, we prove that, if the order of the dihedral group corresponding to K is a power of 2, then the natural homomorphism from GQ to the finite group GTSh(K, K) is surjective. We introduce the Lochak-Schneps conditions on morphisms of GTSh and prove that each morphism of GTSh with the target K in Dih satisfies the Lochak-Schneps conditions. Finally, we conjecture that the natural homomorphism from GQ to the finite group GTSh(K, K) is surjective for every object K of the dihedral poset.
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