English

Pattern avoidance in matchings and partitions

Combinatorics 2012-11-16 v1

Abstract

Extending the notion of pattern avoidance in permutations, we study matchings and set partitions whose arc diagram representation avoids a given configuration of three arcs. These configurations, which generalize 3-crossings and 3-nestings, have an interpretation, in the case of matchings, in terms of patterns in full rook placements on Ferrers boards. We enumerate 312-avoiding matchings and partitions, obtaining algebraic generating functions, in contrast with the known D-finite generating functions for the 321-avoiding (i.e., 3-noncrossing) case. Our approach also provides a more direct proof of a formula of B\'ona for the number of 1342-avoiding permutations. Additionally, we give a bijection proving the shape-Wilf-equivalence of the patterns 321 and 213 which greatly simplifies existing proofs by Backelin--West--Xin and Jel\'{\i}nek, and provides an extension of work of Gouyou-Beauchamps for matchings with fixed points. Finally, we classify pairs of patterns of length 3 according to shape-Wilf-equivalence, and enumerate matchings and partitions avoiding a pair in most of the resulting equivalence classes.

Keywords

Cite

@article{arxiv.1211.3442,
  title  = {Pattern avoidance in matchings and partitions},
  author = {Jonathan Bloom and Sergi Elizalde},
  journal= {arXiv preprint arXiv:1211.3442},
  year   = {2012}
}

Comments

34 pages, 12 Figures, 5 Tables

R2 v1 2026-06-21T22:38:35.595Z