Polylogarithmic Full-Chord Buffon Discrepancy
Abstract
Steinerberger introduced the Buffon discrepancy problem, asking how accurately a one-dimensional set of length L in a convex body can match the Crofton-predicted line-intersection counts, and proved an O(L1/3) upper bound via a Steinhaus longimeter construction. Using the Aistleitner--Bilyk--Nikolov arbitrary-measure star-discrepancy theorem we demonstrate the existence of full-chord constructions with discrepancy O(( L)3/2) for every fixed compact convex body with finite piecewise C2 boundary. In the disk, we prove that every full-chord construction has discrepancy at least Ω( L), using Schmidt's two-dimensional rectangle discrepancy lower bound.
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