Homological properties of 0-Hecke modules for dual immaculate quasisymmetric functions

Abstract

Let n be a nonnegative integer. For each composition α of n, Berg et al. introduced a cyclic indecomposable Hn(0)-module Vα with a dual immaculate quasisymmetric function as the image of the quasisymmetric characteristic. In this paper, we study Vα's from the homological viewpoint. To be precise, we construct a minimal projective presentation of Vα and a minimal injective presentation of Vα as well. Using them, we compute Ext1Hn(0)(Vα, Fβ) and Ext1Hn(0)( Fβ, Vα), where Fβ is the simple Hn(0)-module attached to a composition β of n. We also compute ExtHn(0)i(Vα,Vβ) when i=0,1 and β l α, where l represents the lexicographic order on compositions.