A new bound for finite field Besicovitch sets in four dimensions

Abstract

Let F be a finite field with characteristic greater than two. Define a Besicovitch set in F4 to be a set P ⊂eq F4 containing a line in every direction. The Kakeya conjecture asserts that |P| ≈ |F|4. A result of Wolff establishes that |P| |F|3. In this paper we improve this to |P| |F|3+. On the other hand, we show that the bound of |F|3 is sharp if we relax the assumption that the lines point in different directions. One new feature in the argument is the introduction of a small amount of basic algebraic geometry.

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