On factorization of matrix of Kazhdan-Lusztig polynomials

Abstract

Let H = H(W,S) be the Hecke algebra of the Coxeter system (W,S) over Z[q1], where W is the Weyl group of a symmetrizable Kac-Moody algebra. In this paper, we show that the matrix of Kazhdan-Lusztig polynomials of H factorizes into a product of |S| many matrices, each of which has entries as polynomials in q with nonnegative coefficients. To achieve this goal, we use hybrid basis TCJ for J⊂eq S of H, defined by Grojnowski-Haiman. The intermediate matrices in the aforementioned factorization turn out to be the transition matrices from TCJ-basis to TCI-basis for I⊂ J. Equivalently, these coefficients can be computed using a natural restriction map from H to the parabolic Hecke algebra HJ. Moreover, following the ideas from Grojnowski-Haiman, we also give a geometric proof of the positivity of these coefficients.