A Structural Condition on Point Sets with Few Distinct Dot Products
Abstract
The distinct dot products problem, a variant of the Erdős distinct distances problem, asks "Given a set Pn of n points in R2, what is the minimum number |D(Pn)| of distinct dot products they determine?" The best proven lower bound is |D(Pn)| = Ω(n2/3+7/1425), due to work by Hansonx2013Roche-Newtonx2013Senger, and a recent improvement by Kokkinos. However, the best known construction determines Θ(n) dot products. We provide a structural condition that a point configuration Pn would have to satisfy in order to have 'few' dot products, by which we mean that |D(Pn)| < n34(1-ε) for some ε> 0.
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