English

Square Partitions and Catalan Numbers

Representation Theory 2012-08-16 v1 Combinatorics

Abstract

For each integer k1k\ge 1, we define an algorithm which associates to a partition whose maximal value is at most kk a certain subset of all partitions. In the case when we begin with a partition λ\lambda which is square, i.e λ=λ1...λk>0\lambda=\lambda_1\ge...\ge\lambda_k>0, and λ1=k,λk=1\lambda_1=k,\lambda_k=1, then applying the algorithm \ell times gives rise to a set whose cardinality is either the Catalan number ck+1c_{\ell-k+1} (the self dual case) or twice the Catalan number. The algorithm defines a tree and we study the propagation of the tree, which is not in the isomorphism class of the usual Catalan tree. The algorithm can also be modified to produce a two--parameter family of sets and the resulting cardinalities of the sets are the ballot numbers. Finally, we give a conjecture on the rank of a particular module for the ring of symmetric functions in 2+m2\ell+m variables.

Keywords

Cite

@article{arxiv.0912.4983,
  title  = {Square Partitions and Catalan Numbers},
  author = {Matthew Bennett and Vyjayanthi Chari and R. J. Dolbin and Nathan Manning},
  journal= {arXiv preprint arXiv:0912.4983},
  year   = {2012}
}
R2 v1 2026-06-21T14:28:26.575Z