On partitions avoiding 3-crossings
Abstract
A partition on [n] has a crossing if there exists i\1<i\2<j\1<j\2 such that i\1 and j\1 are in the same block, i\2 and j\2 are in the same block, but i\1 and i\2 are not in the same block. Recently, Chen et al. refined this classical notion by introducing k-crossings, for any integer k. In this new terminology, a classical crossing is a 2-crossing. The number of partitions of [n] avoiding 2-crossings is well-known to be the nth Catalan number C\n=2n n/(n+1). This raises the question of counting k-noncrossing partitions for k 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 k-noncrossing partitions are not P-recursive, for k 4.
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