On parabolic Kazhdan-Lusztig R-polynomials for the symmetric group

Abstract

Parabolic R-polynomials were introduced by Deodhar as parabolic analogues of ordinary R-polynomials defined by Kazhdan and Lusztig. In this paper, we are concerned with the computation of parabolic R-polynomials for the symmetric group. Let Sn be the symmetric group on \1,2,…,n\, and let S=\si\,|\, 1≤ i≤ n-1\ be the generating set of Sn, where for 1≤ i≤ n-1, si is the adjacent transposition. For a subset J⊂eq S, let (Sn)J be the parabolic subgroup generated by J, and let (Sn)J be the set of minimal coset representatives for Sn/(Sn)J. For u≤ v∈ (Sn)J in the Bruhat order and x∈ \q,-1\, let Ru,vJ,x(q) denote the parabolic R-polynomial indexed by u and v. Brenti found a formula for Ru,vJ,x(q) when J=S\si\, and obtained an expression for Ru,vJ,x(q) when J=S\si-1,si\. We introduce a statistic on pairs of permutations in (Sn)J for J=S\si-2,si-1,si\. Then we give a formula for Ru,vJ,x(q), where J=S\si-2,si-1,si\ and i appears after i-1 in v. We also pose a conjecture for Ru,vJ,x(q), where J=S\sk,sk+1,…,si\ with 1≤ k≤ i≤ n-1 and the elements k+1,k+2,…, i appear in increasing order in v.