Asymptotic analysis of k-noncrossing matchings

Abstract

In this paper we study k-noncrossing matchings. A k-noncrossing matching is a labeled graph with vertex set \1,...,2n\ arranged in increasing order in a horizontal line and vertex-degree 1. The n arcs are drawn in the upper halfplane subject to the condition that there exist no k arcs that mutually intersect. We derive: (a) for arbitrary k, an asymptotic approximation of the exponential generating function of k-noncrossing matchings Fk(z). (b) the asymptotic formula for the number of k-noncrossing matchings fk(n) ck n-((k-1)2+(k-1)/2) (2(k-1))2n for some ck>0.