Weak Bruhat interval modules for genomic Schur functions

Abstract

Let λ be a partition of a positive integer n. The genomic Schur function Uλ was introduced by Pechenik--Yong in the context of the K-theory of Grassmannians. Recently, Pechenik provided a positive combinatorial formula for the fundamental quasisymmetric expansion of Uλ in terms of increasing gapless tableaux. In this paper, for each 1 m n, we construct an Hm(0)-module Gλ;m whose image under the quasisymmetric characteristic is the mth degree homogeneous component of Uλ by defining an Hm(0)-action on increasing gapless tableaux. We provide a method to assign a permutation to each increasing gapless tableau, and use this assignment to decompose Gλ;m into a direct sum of weak Bruhat interval modules. Furthermore, we determine the projective cover of each summand of the direct sum decomposition.

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