Kostka functions associated to complex reflection groups

Abstract

Kostka functions Kλ, μ(t) associated to complex reflection groups are a generalization of Kostka polynomials, which are indexed by a pair λ, μ of r-partitions and a sign +, -. It is expected that there exists a close connection between those Kostka functions and the intersection cohomology associated to the enhanced variety X of level r. In this paper, we study combinatorial properties of Kostka functions by making use of the geometry of X. In particular, we show that if μ is of the form μ = (-,…, -, ) and λ is arbitrary, K-λ, μ(t) has a Lascoux-Sch\"utzenberger type combinatorial description.