Volume 1 (2018)
Curien, Nicolas; Ménard, Laurent
The skeleton of the UIPT, seen from infinity
Annales Henri Lebesgue, Volume 1 (2018), pp. 87-125.

Metadata

DOI10.5802/ahl.3
Keywords random planar maps, UIPT, skeleton decomposition, geodesic confluence, discrete $3/2$ stable trees

Abstract

We prove that geodesic rays in the Uniform Infinite Planar Triangulation (UIPT) coalesce in a strong sense using the skeleton decomposition of random triangulations discovered by Krikun. This implies the existence of a unique horofunction measuring distances from infinity in the UIPT. We then use this horofunction to define the skeleton “seen from infinity” of the UIPT and relate it to a simple Galton–Watson tree conditioned to survive, giving a new and particularly simple construction of the UIPT. Scaling limits of perimeters and volumes of horohulls within this new decomposition are also derived, as well as a new proof of the two point function formula for random triangulations in the scaling limit due to Ambjørn and Watabiki.


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