Properties of Random Triangulations and Trees

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Let Tn denote the set of triangulations of a convex polygon K with n sides. We study functions that measure very natural "geometric" features of a triangulation Tn, for example n() which counts the maximal number of diagonals in incident to a single vertex of K. It is familiar that Tn is bijectively equivalent to Bn, the set of rooted binary trees with n - 2 internal nodes, and also to Pn, the set of non-negative lattice paths that start at 0, make 2n - 4 steps Xi of size

Luc Devroye, Philippe Flajolet, Ferran Hurtado, Ma

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Convex Polygon | DCG 1999 | Non-negative Lattice Paths | Triangulation Tn |

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Added	22 Dec 2010
Updated	22 Dec 2010
Type	Journal
Year	1999
Where	DCG
Authors	Luc Devroye, Philippe Flajolet, Ferran Hurtado, Marc Noy, William L. Steiger

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Properties of Random Triangulations and Trees

Convex Polygon | DCG 1999 | Non-negative Lattice Paths | Triangulation Tn |

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