A Solomon Mackey formula for graded bialgebras

Abstract

Given a graded bialgebra H, we let [ k] :H→ H k and m[ k] :H k→ H be its iterated (co)multiplications for all k∈N. For any k-tuple α=( α1,α2,…,αk) ∈Nk of nonnegative integers, and any permutation σ of \ 1,2,…,k\ , we consider the map pα,σ:=m[ k] Pασ-1[ k] :H→ H, where Pα denotes the projection of H k onto its multigraded component Hα1 Hα2·s Hαk, and where σ-1:H→ H permutes the tensor factors. We prove formulas for the composition pα,σ pβ,τ and the convolution pα,σ pβ,τ of two such maps. When H is cocommutative, these generalize Patras's 1994 results (which, in turn, generalize Solomon's Mackey formula). We also construct a combinatorial Hopf algebra *PNSym ("permuted noncommutative symmetric functions") that governs the maps pα,σ for arbitrary connected graded bialgebras H in the same way as the well-known *NSym governs them in the cocommutative case. We end by outlining an application to checking identities for connected graded Hopf algebras.