论文信息 - Ears of triangulations and Catalan numbers

Ears of triangulations and Catalan numbers

Abstract It is known that a convex polygon of n sides admits Cn-2 triangulations, where Cn is a Catalan number. We classify these triangulations (considered as outerplanar graphs) according to their dual trees, and prove the following formula for the number of triangulations of a convex n-gon whose dual tree has exactly k leaves: n k 2 n−2k n−4 2k−4 C k−2 The proof is bijective and provides a recursive formula for the Catalan numbers similar to, but different from, a classical identity of Touchard. An averaging argument allows one to deduce Touchard's formula from ours.

Marc Noy | Ferran Hurtado

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