Variance expansion and Berry-Esseen bound for the number of vertices of a random polygon in a polygon

Abstract

Fix a container polygon P in the plane and consider the convex hull Pn of n≥ 3 independent and uniformly distributed in P random points. In the focus of this paper is the vertex number of the random polygon Pn. The precise variance expansion for the vertex number is determined up to the constant-order term, a result which can be considered as a second-order analogue of the classical expansion for the expectation of R\'enyi and Sulanke (1963). Moreover, a sharp Berry-Esseen bound is derived for the vertex number of the random polygon Pn, which is of the same order as the square-root of the variance. The main idea behind the proof of both results is a decomposition of the boundary of the random polygon Pn into random convex chains and a careful merging of the variance expansions and Berry-Esseen bounds for the vertex numbers of the individual chains.