FIRST PASSAGE PERCOLATION ON A HYPERBOLIC GRAPH ADMITS BI-INFINITE GEODESICS ITAI BENJAMINI AND ROMAIN TESSERA Abstract. Given an infinite connected graph, a way to randomly perturb its metric is to assign random i.i.d.

First Page		Document Content
Date: 2015-12-08 04:38:11 Geometry Mathematics Space Metric geometry Hyperbolic geometry Geometric group theory -hyperbolic space Hyperbolic group Geodesic Differential geometry of surfaces Busemann function Hyperbolic metric space		FIRST PASSAGE PERCOLATION ON A HYPERBOLIC GRAPH ADMITS BI-INFINITE GEODESICS ITAI BENJAMINI AND ROMAIN TESSERA Abstract. Given an infinite connected graph, a way to randomly perturb its metric is to assign random i.i.d. Add to Reading List Source URL: www.normalesup.org Download Document from Source Website File Size: 105,21 KB Share Document on Facebook

	Coarse Geometry and Randomness Itai Benjamini October 30, 2013 Contents 1 Introductory graph and metric notions DocID: 1xW27 - View Document
	Vladimir S. Matveev (Jena) Vladimir S. Matveev (Jena) How to reconstruct a metric by its unparameterized geodesics. Lorenz Geometry, Granada, DocID: 1rR2F - View Document
	A Lorentz metric on the manifold of positive definite (2 x 2)-matrices and foliations by ellipses Marcos Salvai ´ FaMAF (UNC) – CIEM (CONICET), Cordoba, DocID: 1rsXz - View Document
	Lassoing Phylogenetic Trees Katharina Huber, School of Computing Sciences, University of East Anglia, UK September 23, 2015 DocID: 1rrmV - View Document
	HagenQuasiArb10Feb2103.dvi DocID: 1rmpQ - View Document