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 . 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 , these are all the Wilf-equivalences except for those arising from complementation. If is a partition of and denotes the set of all partitions of that avoid , we establish inequalities between and for several choices of and , and we prove that if is the partition of with only one block, then for all and all partitions of with exactly two blocks. We conjecture that this result holds for all partitions of . Finally, we enumerate for all partitions of .
Keywords
Cite
@article{arxiv.1511.00192,
title = {Pattern avoidance for set partitions \`a la Klazar},
author = {Jonathan Bloom and Dan Saracino},
journal= {arXiv preprint arXiv:1511.00192},
year = {2023}
}
Comments
21 pages