Regular Schur labeled skew shape posets and their 0-Hecke modules
Abstract
Assuming Stanley's P-partition conjecture holds, the regular Schur labeled skew shape posets with underlying set \1,2,…, n\ are precisely the posets P such that the P-partition generating function is symmetric and the set of linear extensions of P, denoted L(P), is a left weak Bruhat interval in the symmetric group Sn. We describe the permutations in L(P) in terms of reading words of standard Young tableaux when P is a regular Schur labeled skew shape poset, and classify L(P)'s up to descent-preserving isomorphism as P ranges over regular Schur labeled skew shape posets. The results obtained are then applied to classify the 0-Hecke modules MP associated with regular Schur labeled skew shape posets P up to isomorphism. Then we characterize regular Schur labeled skew shape posets as the posets whose linear extensions form a dual plactic-closed subset of Sn. Using this characterization, we construct distinguished filtrations of MP with respect to the Schur basis when P is a regular Schur labeled skew shape poset. Further issues concerned with the classification and decomposition of the 0-Hecke modules MP are also discussed.
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