Central limit theorems for the nearest neighbour embracing graph in Euclidean and hyperbolic space

Abstract

Consider a stationary Poisson process η in the d-dimensional Euclidean or hyperbolic space and construct a random graph with vertex set η as follows. First, each point x∈η is connected by an edge to its nearest neighbour, then to its second nearest neighbour and so on, until x is contained in the convex hull of the points already connected to x. The resulting random graph is the so-called nearest neighbour embracing graph. The main result of this paper is a quantitative description of the Gaussian fluctuations of geometric functionals associated with the nearest neighbour embracing graph. More precisely, the total edge length, more general length-power functionals and the number of vertices with given outdegree are considered.

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