Character formulas and descents for the hyperoctahedral group

A general setting to study a certain type of formulas, expressing characters of the symmetric group $\mathfrak{S}_n$ explicitly in terms of descent sets of combinatorial objects, has been developed by two of the authors. This theory is further investigated in this paper and extended to the hyperoctahedral group $B_n$. Key ingredients are a new formula for the irreducible characters of $B_n$, the signed quasisymmetric functions introduced by Poirier, and a new family of matrices of Walsh--Hadamard type. Applications include formulas for natural $B_n$-actions on coinvariant and exterior algebras and on the top homology of a certain poset in terms of the combinatorics of various classes of signed permutations, as well as a $B_n$-analogue of an equidistribution theorem of D\'esarm\'enien and Wachs.