Pattern avoidance for set partitions \`a la Klazar

Abstract

In 2000 Klazar introduced a new notion of pattern avoidance in the context of set partitions of [n]=\1,…, n\. The purpose of the present paper is to undertake a study of the concept of Wilf-equivalence based on Klazar's notion. We determine all Wilf-equivalences for partitions with exactly two blocks, one of which is a singleton block, and we conjecture that, for n≥ 4, these are all the Wilf-equivalences except for those arising from complementation. If τ is a partition of [k] and n(τ) denotes the set of all partitions of [n] that avoid τ, we establish inequalities between |n(τ1)| and |n(τ2)| for several choices of τ1 and τ2, and we prove that if τ2 is the partition of [k] with only one block, then |n(τ1)| <|n(τ2)| for all n>k and all partitions τ1 of [k] with exactly two blocks. We conjecture that this result holds for all partitions τ1 of [k]. Finally, we enumerate n(τ) for all partitions τ of [4].