Enumeration of linear chord diagrams

Abstract

A linear chord diagram canonically determines a fatgraph and hence has an associated genus g. We compute the natural generating function Cg(z)=Σn≥ 0 cg(n)zn for the number cg(n) of linear chord diagrams of fixed genus g≥ 1 with a given number n≥ 0 of chords and find the remarkably simple formula Cg(z)=z2gRg(z) (1-4z)1 2-3g, where Rg(z) is a polynomial of degree at most g-1 with integral coefficients satisfying Rg(1 4)≠ 0 and Rg(0) = cg(2g)≠ 0. In particular, Cg(z) is algebraic over C(z), which generalizes the corresponding classical fact for the generating function C0(z) of the Catalan numbers. As a corollary, we also calculate a related generating function germaine to the enumeration of knotted RNA secondary structures, which is again found to be algebraic.