Polygonal Dissections and Reversions of Series

Abstract

The Catalan numbers Ck were first studied by Euler, in the context of enumerating triangulations of polygons Pk+2. Among the many generalizations of this sequence, the Fuss-Catalan numbers C(d)k count enumerations of dissections of polygons Pk(d-1)+2 into (d+1)-gons. In this paper, we provide a formula enumerating polygonal dissections of (n+2)-gons, classified by partitions λ of [n]. We connect these counts aλ to reverse series arising from iterated polynomials. Generalizing this further, we show that the coefficients of the reverse series of polynomials x=z-Σj=0∞ bj zj+1 enumerate colored polygonal dissections.