A Consecutive Lehmer Code for Parabolic Quotients of the Symmetric Group

Abstract

In this article we define an encoding for parabolic permutations that distinguishes between parabolic 231-avoiding permutations. We prove that the componentwise order on these codes realizes the parabolic Tamari lattice, and conclude a direct and simple proof that the parabolic Tamari lattice is isomorphic to a certain -Tamari lattice, with an explicit bijection. Furthermore, we prove that this bijection is closely related to the map used when the lattice isomorphism was first proved in (Ceballos, Fang and M\"uhle, 2020), settling an open problem therein.