Local properties of the random Delaunay triangulation model and topological models of 2D gravity

  • Séverin Charbonnier

    Université Paris-Saclay, Gif-sur-Yvette, France
  • François David

    Université Paris Saclay, Gif-sur-Yvette, France
  • Bertrand Eynard

    Université Paris Saclay,Gif-sur-Yvette, France, and Université de Montréal, Canada
Local properties of the random Delaunay triangulation model and topological models of 2D gravity cover

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Abstract

Delaunay triangulations provide a bijection between a set of points in generic position in the complex plane, and the set of triangulations with given circumcircle intersection angles. The uniform Lebesgue measure on these angles translates into a Kähler measure for Delaunay triangulations, or equivalently on the moduli space of genus zero Riemann surfaces with marked points. We study the properties of this measure. First we relate it to the topological Weil–Petersson symplectic form on the moduli space . Then we show that this measure, properly extended to the space of all triangulations on the plane, has maximality properties for Delaunay triangulations. Finally we show, using new local inequalities on the measures, that the volume on triangulations with points is monotonically increasing when a point is added, . We expect that this can be a step towards seeing that the large limit of random triangulations can tend to the Liouville conformal field theory.

Cite this article

Séverin Charbonnier, François David, Bertrand Eynard, Local properties of the random Delaunay triangulation model and topological models of 2D gravity. Ann. Inst. Henri Poincaré Comb. Phys. Interact. 6 (2019), no. 3, pp. 313–355

DOI 10.4171/AIHPD/73