A refined energy bound for perpendicular bisectors

Abstract

Let P be a set of n points in the Euclidean plane. We prove that, for any ε > 0, either a single line or circle contains n/2 points of P, or the number of distinct perpendicular bisectors determined by pairs of points in P is (n52/35 - ε), where the constant implied by the notation depends on P. This is progress toward a conjecture of Lund, Sheffer, and de Zeeuw, that either a single line or circle contains n/2 points of P, or the number of distinct perpendicular bisectors is (n2). The proof relies bounding the size of a carefully selected subset of the quadruples (a,b,c,d) ∈ P4 such that the perpendicular bisector of a and b is the same as the perpendicular bisector of c and d.