A note on large Kakeya sets

Abstract

A Kakeya set K in an affine plane of order q is the point set covered by a set L of q+1 pairwise non-parallel lines. Large Kakeya sets were studied by Dover and Mellinger; in [6] they showed that Kakeya sets with size at least q2-3q+9 contain a large knot (a point of K lying on many lines of L). In this paper, we improve on this result by showing that Kakeya set of size at least ≈ q2-qq+32q contain a large knot. Furthermore, we obtain a sharp result for planes of square order containing a Baer subplane.