Tight Bound and Structural Theorem for Joints

Abstract

A joint of a set of lines L in Fd is a point that is contained in d lines with linearly independent directions. The joints problem asks for the maximum number of joints that are formed by L lines. Guth and Katz showed that the number of joints is at most O(L3/2) in R3 using polynomial method. This upper bound is met by the construction given by taking the joints and the lines to be all the d-wise intersections and all the (d-1)-wise intersections of M hyperplanes in general position. Furthermore, this construction is conjectured to be optimal. In this paper, we verify the conjecture and show that this is the only optimal construction by using a more sophisticated polynomial method argument. This is the first tight bound and structural theorem obtained using this method. We also give a new definition of multiplicity that strengthens the main result of a previous work by Tidor, Zhao and the second author. Lastly, we relate the joints problem to some set-theoretic problems and prove conjectures of Bollob\'as and Eccles regarding partial shadows.