On cliques in three-dimensional dense point-line arrangements
Abstract
As a variant of the celebrated Szemer\'edi--Trotter theorem, Guth and Katz proved that m points and n lines in R3 with at most n lines in a common plane must determine at most O(m1/2n3/4) incidences for n1/2≤ m≤ n3/2. This upper bound is asymptotically tight and has an important application in Erdos distinct distance problem. We characterize the extremal constructions towards the Guth--Katz bound by proving that such a large dense point-line arrangement must contain a k-clique in general position provided m n. This is an analog of a result by Solymosi for extremal Szemer\'edi--Trotter constructions in the plane.
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