Hopf Algebras and Invariants of the Johnson Cokernel

Abstract

We show that if H is a cocommutative Hopf algebra, then there is a natural action of Aut(Fn) on the nth tensor power of H which induces an Out(Fn) action on a quotient H n. In the case when H=T(V) is the tensor algebra, we show that the invariant TrC of the cokernel of the Johnson homomorphism studied in [J. Conant, The Johnson cokernel and the Enomoto-Satoh invariant, Algebraic and Geometric Topology, 15 (2015), no. 2, 801--821.] projects to take values in the top dimensional cohomology of Out(Fn) with coefficients in H n. We analyze the n=2 case, getting large families of obstructions generalizing the abelianization obstructions of [J. Conant, M. Kassabov, K. Vogtmann, Higher hairy graph homology, Journal of Topology, Geom. Dedicata 176 (2015), 345--374.].