A Fock space model for decomposition numbers for quantum groups at roots of unity

Abstract

In this paper we construct an "abstract Fock space" for general Lie types that serves as a generalisation of the infinite wedge q-Fock space familiar in type A. Specifically, for each positive integer , we define a Z[q,q-1]-module F with bar involution by specifying generators and "straightening relations" adapted from those appearing in the Kashiwara-Miwa-Stern formulation of the q-Fock space. By relating F to the corresponding affine Hecke algebra we show that the abstract Fock space has standard and canonical bases for which the transition matrix produces parabolic affine Kazhdan-Lusztig polynomials. This property and the convenient combinatorial labeling of bases of F by dominant integral weights makes F a useful combinatorial tool for determining decomposition numbers of Weyl modules for quantum groups at roots of unity.