English

Lattice Polynomials, 12312-Avoiding Partial Matchings and Even Trees

Combinatorics 2010-11-17 v1

Abstract

The lattice polynomials Li,j(x)L_{i,j}(x) are introduced by Hough and Shapiro as a weighted count of certain lattice paths from the origin to the point (i,j)(i,j). In particular, L2n,n(x)L_{2n, n}(x) reduces to the generating function of the numbers Tn,k=1n(n1+kn1)(2nkn+1)T_{n,k}={1\over n}{n-1+k\choose n-1}{2n-k\choose n+1}, which can be viewed as a refinement of the 33-Catalan numbers Tn=12n+1(3nn)T_n=\frac{1}{2n+1}{3n\choose n}. In this paper, we establish a correspondence between 1231212312-avoiding partial matchings and lattice paths, and we show that the weighted count of such partial matchings with respect to the number of crossings in a more general sense coincides with the lattice polynomials Li,j(x)L_{i,j}(x). We also introduce a statistic on even trees, called the rr-index, and show that the number of even trees with 2n2n edges and with rr-index kk equal to Tn,kT_{n,k}.

Keywords

Cite

@article{arxiv.1011.3650,
  title  = {Lattice Polynomials, 12312-Avoiding Partial Matchings and Even Trees},
  author = {William Y. C. Chen and Louis W. Shapiro and Susan Y. J. Wu},
  journal= {arXiv preprint arXiv:1011.3650},
  year   = {2010}
}

Comments

11 pages, 9 figures

R2 v1 2026-06-21T16:44:28.803Z