An explicit lower bound for the unit distance problem
Abstract
We show that there are sets of n points in the plane with n arbitrarily large that contain more than n1.014 pairs of points separated by a distance exactly 1. This improves on very recent work of a team at OpenAI, who proved the same result with an inexplicit exponent greater than 1, drastically improving on the best previous lower bound and disproving a conjecture of Erdős. The method is number-theoretic, relying on constructing algebraic number fields of large degree and small discriminant with many primes of small norm via a Golod-Shafarevich criterion argument.
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