Pattern avoidance and quasisymmetric functions

Abstract

Given a set of permutations Pi, let Sn(Pi) denote the set of permutations in the symmetric group Sn that avoid every element of Pi in the sense of pattern avoidance. Given a subset S of 1,...,n-1, let FS be the fundamental quasisymmetric function indexed by S. Our object of study is the generating function Qn(Pi) = sum FDes sigma where the sum is over all sigma in Sn(Pi) and Des sigma is the descent set of sigma. We characterize those Pi contained in S3 such that Qn(Pi) is symmetric or Schur nonnegative for all n. In the process, we show how each of the resulting Pi can be obtained from a theorem or conjecture involving more general sets of patterns. In particular, we prove results concerning symmetries, shuffles, and Knuth classes, as well as pointing out a relationship with the arc permutations of Elizalde and Roichman. Various conjectures and questions are mentioned throughout.