English

On Extremal Problems Associated with Random Chords on a Circle

Metric Geometry 2024-06-12 v1 Probability

Abstract

Inspired by the work of Karamata, we consider an extremization problem associated with the probability of intersecting two random chords inside a circle of radius r,r(0,1]r, \, r \in (0,1], where the endpoints of the chords are drawn according to a given probability distribution on S1\mathbb{S}^1. We show that, for r=1,r=1, the problem is degenerated in the sense that any continuous measure is an extremiser, and that, for rr sufficiently close to 1,1, the desired maximal value is strictly below the one for r=1r=1 by a polynomial factor in 1r.1-r. Finally, we prove, by considering the auxiliary problem of drawing a single random chord, that the desired maximum is 1/41/4 for r(0,1/2).r \in (0,1/2). Connections with other variational problems and energy minimization problems are also presented.

Keywords

Cite

@article{arxiv.2406.06771,
  title  = {On Extremal Problems Associated with Random Chords on a Circle},
  author = {Cynthia Bortolotto and João P. G. Ramos},
  journal= {arXiv preprint arXiv:2406.06771},
  year   = {2024}
}

Comments

23 pages, 3 figures

R2 v1 2026-06-28T17:00:29.073Z