Revisiting pattern avoidance and quasisymmetric functions

Abstract

Let Sn be the nth symmetric group. Given a set of permutations Pi we denote by Sn(Pi) the set of permutations in Sn which avoid Pi in the sense of pattern avoidance. Consider the generating function Qn(Pi) = sumpi FDes pi where the sum is over all pi in Sn(Pi) and FDes pi is the fundamental quasisymmetric function corresponding to the descent set of pi. Hamaker, Pawlowski, and Sagan introduced Qn(Pi) and studied its properties, in particular, finding criteria for when this quasisymmetric function is symmetric or even Schur nonnegative for all n >= 0. The purpose of this paper is to continue their investigation answering some of their questions, proving one of their conjectures, as well as considering other natural questions about Qn(Pi). In particular we look at Pi of small cardinality, superstandard hooks, partial shuffles, Knuth classes, and a stability property.