Tamari Lattices for Parabolic Quotients of the Symmetric Group

Abstract

We generalize the Tamari lattice by extending the notions of 231-avoiding permutations, noncrossing set partitions, and nonnesting set partitions to parabolic quotients of the symmetric group Sn. We show bijectively that these three objects are equinumerous. We show how to extend these constructions to parabolic quotients of any finite Coxeter group. The main ingredient is a certain aligned condition of inversion sets; a concept which can in fact be generalized to any reduced expression of any element in any (not necessarily finite) Coxeter group.