The projective cover of tableau-cyclic indecomposable Hn(0)-modules

Abstract

Let α be a composition of n and σ a permutation in S(α). This paper concerns the projective covers of Hn(0)-modules Vα, Xα and Sσα, which categorify the dual immaculate quasisymmetric function, the extended Schur function, and the quasisymmetric Schur function when σ is the identity, respectively. First, we show that the projective cover of Vα is the projective indecomposable module Pα due to Norton, and Xα and the φ-twist of the canonical submodule Sσβ,C of Sσβ for (β,σ)'s satisfying suitable conditions appear as Hn(0)-homomorphic images of Vα. Second, we introduce a combinatorial model for the φ-twist of Sσα and derive a series of surjections starting from Pα to the φ-twist of Sidα,C. Finally, we construct the projective cover of every indecomposable direct summand Sσα, E of Sσα. As a byproduct, we give a characterization of triples (σ, α, E) such that the projective cover of Sσα, E is indecomposable.