Sigurður Örn Stefánsson (30/10/17)

Anders Claesson, október 26, 2017

Málstofa í stærðfræði

Fyrirlesari: Sigurður Örn Stefánsson, University of Iceland

Titill: The phase structure of random outerplanar maps

Staðsetning: VRII-158
Tími: Mánudagur 30. október kl. 15:00


An outerplanar map is a drawing of a planar graph in the sphere which has the property that there is a face in the map such that all the vertices lie on the boundary of that face. We study the phase diagram of random outerplanar maps sampled according to non-negative weights that are assigned to each face of a map. We prove that for certain choices of weights the map looks like a rescaled version of its boundary when its number of vertices tends to infinity. The outerplanar maps are then shown to converge in the Gromov-Hausdorff sense towards the α-stable looptree introduced by Curien and Kortchemski (2014), with the parameter α depending on the specific weight-sequence. This allows us to describe the transition of the asymptotic geometric shape from a deterministic circle to the Brownian tree.

Based on arXiv:1710.04460 with Benedikt Stufler.