Buffon Discrepancy and the Steinhaus Longimeter
Classical Analysis and ODEs
2026-03-31 v1 Combinatorics
Metric Geometry
Abstract
Let be a convex set. We study the problem of distributing a one-dimensional set with total length so that for any line in the number of intersections is proportional to the length as much as possible; we use the term Buffon discrepancy for the largest error. A construction of Steinhaus can be generalized to prove the existence of sets with Buffon discrepancy . We also show that the unit disk admits a set with uniformly bounded Buffon discrepancy as .
Keywords
Cite
@article{arxiv.2603.27807,
title = {Buffon Discrepancy and the Steinhaus Longimeter},
author = {Stefan Steinerberger},
journal= {arXiv preprint arXiv:2603.27807},
year = {2026}
}