On k-noncrossing partitions

Abstract

In this paper we prove a duality between k-noncrossing partitions over [n]=\1,...,n\ and k-noncrossing braids over [n-1]. This duality is derived directly via (generalized) vacillating tableaux which are in correspondence to tangled-diagrams Reidys:07vac. We give a combinatorial interpretation of the bijection in terms of the contraction of arcs of tangled-diagrams. Furthermore it induces by restriction a bijection between k-noncrossing, 2-regular partitions over [n] and k-noncrossing braids without isolated points over [n-1]. Since braids without isolated points correspond to enhanced partitions this allows, using the results of MIRXIN, to enumerate 2-regular, 3-noncrossing partitions.