A new proof of Rédei’s theorem on the number of directions

Abstract

AbstractRédei and Megyesi proved that the number of directions determined by a p-element subset of $${\mathbb F}_p^2$$ F p 2 is either 1 or at least $$\frac{p+3}{2}$$ p + 3 2 . The same result was independently obtained by Dress, Klin, and Muzychuk. We give a new and short proof of this result using a lemma proved by Kiss and the author. The new proof relies on a result on polynomials over finite fields.