中文

On partitions avoiding 3-crossings

组合数学 2009-01-23 v2

摘要

A partition on [n][n] has a crossing if there exists i_1<i_2<j_1<j_2i\_1<i\_2<j\_1<j\_2 such that i_1i\_1 and j_1j\_1 are in the same block, i_2i\_2 and j_2j\_2 are in the same block, but i_1i\_1 and i_2i\_2 are not in the same block. Recently, Chen et al. refined this classical notion by introducing kk-crossings, for any integer kk. In this new terminology, a classical crossing is a 2-crossing. The number of partitions of [n][n] avoiding 2-crossings is well-known to be the nnth Catalan number C_n=(2nn)/(n+1)C\_n={{2n}\choose n}/(n+1). This raises the question of counting kk-noncrossing partitions for k3k\ge 3. We prove that the sequence counting 3-noncrossing partitions is P-recursive, that is, satisfies a linear recurrence relation with polynomial coefficients. We give explicitly such a recursion. However, we conjecture that kk-noncrossing partitions are not P-recursive, for k4k\ge 4.

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引用

@article{arxiv.math/0506551,
  title  = {On partitions avoiding 3-crossings},
  author = {Mireille Bousquet-Mélou and Guoce Xin},
  journal= {arXiv preprint arXiv:math/0506551},
  year   = {2009}
}