On random approximations by generalized disc-polygons
Abstract
For two convex discs and , we say that is -convex if it is equal to the intersection of all translates of that contain . In -convexity the set plays a similar role as closed half-spaces do in the classical notion of convexity. We study the following probability model: Let and be smooth convex discs such that is -convex. Select i.i.d. uniform random points from , and consider the intersection of all translates of that contain all of . The set is a random -convex polygon in . We study the expectation of the number of vertices and the missed area as tends to infinity. We consider two special cases of the model. In the first case we assume that the maximum of the curvature of the boundary of is strictly less than and the minimum of the curvature of is larger than . In this setting the expected number of vertices and missed area behave in a similar way as in the classical convex case and in the -spindle convex case (when is a radius circular disc). The other case we study is when . This setting is special in the sense that an interesting phenomenon occurs: the expected number of vertices tends to a finite limit depending only on . This was previously observed in the special case when is a circle of radius (Fodor, Kevei and V\'igh (2014)). We also determine the extrema of the limit of the expectation of the number of vertices of if is a convex discs of constant width . The formulas we prove can be considered as generalizations of the corresponding -spindle convex statements proved by Fodor, Kevei and V\'igh (2014).
Keywords
Cite
@article{arxiv.1907.01868,
title = {On random approximations by generalized disc-polygons},
author = {Ferenc Fodor and Dániel I. Papvári and Viktor Vígh},
journal= {arXiv preprint arXiv:1907.01868},
year = {2026}
}