A relation between the shape of a permutation and the shape of the base poset derived from the Lehmer codes

Abstract

For a permutation ω ∈ Sn Denoncourt constructed a poset Mω which is the set of join-irreducibles of the Lehmer codes of the permutations in [e, ω] in the inversion order on Sn. In this paper we show that Mω is a B2-free poset if and only if ω is a 3412-3421-avoiding permutation.