Distinguished filtrations of the 0-Hecke modules for dual immaculate quasisymmetric functions

Abstract

Let α range over the set of compositions. Dual immaculate quasisymmetric functions Sα*, introduced by Berg, Bergeron, Saliola, Serrano, and Zabrocki, provide a quasisymmetric analogue of Schur functions. They also constructed an indecomposable 0-Hecke module Vα whose image under the quasisymmetric characteristic is Sα*. In this paper, we prove that Vα admits a distinguished filtration with respect to the basis of Young quasisymmetric Schur functions. This result offers a novel representation-theoretic interpretation of the positive expansion of Sα* in the basis of Young quasisymmetric Schur functions. A key tool in our proof is Mason's analogue of the Robinson-Schensted-Knuth algorithm, for which we establish a version of Green's theorem. As an unexpected byproduct of our investigation, we construct an indecomposable 0-Hecke module Yα whose image under the quasisymmetric characteristic is the Young quasisymmetric Schur function Sα. Further properties of this module are also investigated. And, by applying a suitable automorphism twist to this module, we obtain an indecomposable 0-Hecke module whose image under the quasisymmetric characteristic is the quasisymmetric Schur function Sα.