The Worpitzky identity for the groups of signed and even-signed permutations

Abstract

The well-known Worpitzky identity provides a connection between two bases of Q[x]: The standard basis (x+1)n and the binomial basis x+n-i n, where the Eulerian numbers for the Coxeter group of type A (the symmetric group) serve as the entries of the transformation matrix. Brenti has generalized this identity to the Coxeter groups of types B and D (signed and even-signed permutations groups, respectively) using generating function techniques. Motivated by Foata-Sch\"utzenberger and Rawlings' proof for the Worpitzky identity in the symmetric group, we provide combinatorial proofs of this identity and for their q-analogues in the Coxeter groups of types B and D.