Stretch Factor of Long Paths in a planar Poisson-Delaunay Triangulation

Abstract

Let X:=Xn\(0,0),(1,0)\, where Xn is a planar Poisson point process of intensity n. We provide a first non-trivial lower bound for the distance between the expected length of the shortest path between (0,0) and (1,0) in the Delaunay triangulation associated with X when the intensity of Xn goes to infinity. Experimental values indicate that the correct value is about 1.04. We also prove that the expected number of Delaunay edges crossed by the line segment [(0,0),(1,0)] is equivalent to 2.16n and that the expected length of a particular path converges to 1.18 giving an upper bound on the stretch factor.