Poset modules of the 0-Hecke algebras of type B

Abstract

In 2001, Chow developed the theory of the Bn posets P and the type B P-partition enumerators KBP. To provide a representation-theoretic interpretation of KBP, we define the poset modules MBP of the 0-Hecke algebra HnB(0) of type B by endowing the set of type-B linear extensions of P with an HnB(0)-action. We then show that the Grothendieck group of the category associated to type-B poset modules is isomorphic to the space of type B quasisymmetric functions as both a QSym-module and comodule, where QSym denotes the Hopf algebra of quasisymmetric functions. Considering an equivalence relation on Bn posets, where two posets are equivalent if they share the same set of type-B linear extensions, we identify a natural representative of each equivalence class, which we call a distinguished poset. We further characterize the distinguished posets whose sets of type-B linear extensions form intervals in the right weak Bruhat order on the the hyperoctahedral groups. Finally, we discuss the relationship among the categories associated to type-B weak Bruhat interval modules, Bn poset modules, and finite-dimensional HnB(0)-modules.