Maximal $(k+1)$-crossing-free graphs on a planar point set in convex
position, that is, $k$-triangulations, have received attention in recent
literature, with motivation coming from several interpretations of them.
  We introduce a new way of looking at $k$-triangulations, namely as complexes
of star polygons. With this tool we give new, direct, proofs of the fundamental
properties of $k$-triangulations, as well as some new results. This
interpretation also opens-up new avenues of research, that we briefly explore
in the last section.Comment: 40 pages, 24 figures; added references, update Section 

A. Björner

A. Lee

A.W.M. Dress

C. Hohlweg

C. Krattenthaler

C.W. Lee

D.D. Sleator

D.E. Knuth

E. Ackerman

F. Santos

Francisco Santos

G. Rote

G.M. Ziegler

H.S.M. Coxeter

J. Herzog

J. Jonsson

J. Richter-Gebert

J.-L. Loday

J.E. Graver

J.S. Birman

L.J. Billera

M. Desainte-Catherine

M. Pocchiola

N.V. Ivanov

R.P. Stanley

S. Elizalde

S. Fomin

T. Nakamigawa

V. Capoyleas

Vincent Pilaud

W. Whiteley

English

arXiv

Crossref

Multitriangulations as Complexes of Star Polygons

A $k$-triangulation of a convex polygon is a maximal set of diagonals so that no $k+1$ of them mutually cross. $k$-triangulations have received attention in recent literature, with motivation coming from several interpretations of them. We present a new way of looking at $k$-triangulations, where certain star polygons naturally generalize triangles for $k$-triangulations. With this tool we give new, direct proofs of the fundamental properties of $k$-triangulations (number of edges, definition of flip). This interpretation also opens up new avenues of research that we briefly explore in the last section

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Multi-triangulations as complexes of star polygons

International audienceMaximal $(k+1)$-crossing-free graphs on a planar point set in convex position, that is, $k$-triangulations, have received attention in recent literature, motivated by several interpretations of them. We introduce a new way of looking at $k$-triangulations, namely as complexes of star polygons. With this tool we give new, direct proofs of the fundamental properties of $k$-triangulations, as well as some new results. This interpretation also opens up new avenues of research that we briefly explore in the last section

Pilaud, Vincent

Santos, Francisco

HAL: Hyper Article en Ligne

Multitriangulations as complexes of star-polygons

HAL-Polytechnique

A $k$-triangulation of a convex polygon is a maximal set of diagonals so that no $k+1$ of them mutually cross. $k$-triangulations have received attention in recent literature, with motivation coming from several interpretations of them. We present a new way of looking at $k$-triangulations, where certain star polygons naturally generalize triangles for $k$-triangulations. With this tool we give new, direct proofs of the fundamental properties of $k$-triangulations (number of edges, definition of flip). This interpretation also opens up new avenues of research that we briefly explore in the last section.Une $k$-triangulation d'un polygone convexe est un ensemble maximal de diagonales ne contenant pas $k+1$ arêtes qui se croisent deux à deux. Les $k$-triangulations ont été récemment étudiées sous divers aspects dans la littérature. On présente ici un nouveau point de vue sur les $k$-triangulations, en introduisant certains polygones étoilés comme généralisation des triangles pour les $k$-triangulations. En utilisant ce nouvel outil, on donne des preuves directes des propriétés fondamentales des $k$-triangulations (nombre d'arêtes, définition du flip). Notre point de vue ouvre par ailleurs de nouveaux horizons de recherche que l'on présente rapidement dans la dernière partie

Episciences.org

Multi-triangulations as complexes of star polygons

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Directory of Open Access Journals

HAL: Hyper Article en Ligne

HAL-Polytechnique

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