On the combinatorics of descents and inverse descents in the hyperoctahedral group

Abstract

The elements in the hyperoctahedral group Bn can be treated as signed permutations with the natural order ·s<-2<-1<0<1<2<·s, or as colored permutations with the r-order -1<r-2<r·s<r0<r1<r2<r·s. For any π∈Bn, let desB(π) and idesB(π) be the number of descents and inverse descents in π under the natural order, and let desB(π) and idesB(π) be the number of descents and inverse descents in π under the r-order. In this paper, by investigating signed permutation grids under both the natural order and the r-order, we give combinatorial proofs for six recurrence formulas of the joint distribution of descents and inverse descents over the hyperoctahedral group Bn, the set in involutions of Bn denoted by InB, and the set of fixed-point free involutions in Bn denoted by JnB, respectively. Some of these six formulas are new, and some reveal the combinatorial essences of the results obtained by Visontai, Moustakas and Cao-Liu through algebraic approaches such as quasisymmetric functions. Furthermore, from these formulas, we conclude that (desB,idesB) and (desB,idesB) are equidistributed over both Bn and InB, but not on JnB.