Connes-Moscovici characteristic map is a Lie algebra morphism

Abstract

Let H be a Hopf algebra with a modular pair in involution (,1). Let A be a (module) algebra over H equipped with a non-degenerated -invariant 1-trace τ. We show that Connes-Moscovici characteristic map τ:HC*(,1)(H)→ HC*λ(A) is a morphism of graded Lie algebras. We also have a morphism of Batalin-Vilkovisky algebras from the cotorsion product of H, CotorH*(,), to the Hochschild cohomology of A, HH*(A,A). Let K be both a Hopf algebra and a symmetric Frobenius algebra. Suppose that the square of its antipode is an inner automorphism by a group-like element. Then this morphism of Batalin-Vilkovisky algebras :CotorK^*(F,F) ExtK(F,F) HH*(K,K) is injective.