Random convex chains through the lens of analytic combinatorics
Abstract
Consider the triangle T with vertices (0,0), (0,1), and (1,0). The lower boundary of the convex hull of (0,1), (1,0), together with n independent uniformly distributed random points in T, is called a random convex chain and denoted by Tn. We study the random variable f0(Tn), the number of vertices of this chain. Our first result gives an explicit expression for the bivariate generating function of the probabilities P(f0(Tn)=k+2) in terms of the Gaussian hypergeometric function. Building on this analytic representation, we apply a careful singularity analysis to derive a variety of limit theorems for f0(Tn), including a quantitative central limit theorem, a large deviation principle as well as a precise asymptotics for the probabilities P(f0(Tn)=k+2). Conceptually, our results establish a novel bridge between stochastic geometry and methods from analytic combinatorics.
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