Enhanced variety of higher level and Kostka functions associated to complex reflection groups

Abstract

Let V be an n dimensional vector space over an algebraic closure of a finite field Fq and put G = GL(V). For a positive integer r, we consider the variety Xuni = Guni × Vr-1, on which G acts diagonally. Xuni is the "unipotent part" of the enhanced variety of level r. Xuni is partitioned into finitely many pieces Xλ labelled by r-partitions λ of n, and we consider the intersection cohomology ICλ associated to Xλ. In this paper, we show that the Frobenius trace functions (over Fq) associated to those ICλ satisfy certain orthogonality relations, which are very close to the equations characterizing the Kostka functions indexed by (a pair of) r-partitions. Using this we show, in some special cases, that the Kostka functions can be described in terms of those intersection cohomology, which is a (partial) generalization of the known results for the case r = 1, 2.