Leading coefficients of Kazhdan--Lusztig polynomials for Deodhar elements

Abstract

We show that the leading coefficient of the Kazhdan--Lusztig polynomial Px,w(q) known as μ(x,w) is always either 0 or 1 when w is a Deodhar element of a finite Weyl group. The Deodhar elements have previously been characterized using pattern avoidance by Billey--Warrington (2001) and Billey--Jones (2007). In type A, these elements are precisely the 321-hexagon avoiding permutations. Using Deodhar's (1990) algorithm, we provide some combinatorial criteria to determine when μ(x,w) = 1 for such permutations w.