A stabilizer interpretation of the Grothendieck-Teichmüller group GRT1( k)

Abstract

If u and v are Lie algebras, then the product Out( u)× Out( v) of their outer automorphism groups naturally acts on the set of outer Lie algebra morphisms from u to v; the stabilizer of the outer class of a given such morphism is then a subgroup of Out( u)× Out( v). We show that this leads to two related interpretation of the Grothendieck-Teichmüller group GRT1( k), where u, v are the Lie algebra of infinitesimal braids on the plane (resp. framed infinitesimal braids on the sphere) with 3 and 4 (resp. 4 and 5) strands: namely, it can be expressed as the joint intersection of the stabilizer groups of the outer classes of certain strand doubling morphisms ϕ and ψ with Out*( u)×Out( v), where Out*( u) is a subgroup of Out( u) of outer classes of inertia-preserving automorphisms of u.

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