Determination of hyperovals by lines through a few points

Abstract

If S is a set of q+2 points in P2(Fq) such that some point of S is not on any line containing two other points of S, then in suitable coordinates S has the form Sf:=(c:f(c):1) : c in Fq U (1:0:0),(0:1:0) for some f(X) in Fq[X]. Let T be a subset of Sf which contains the two infinite points and at least 3+log3(q)/4 finite points. We show that if there is no line passing through a point of T and two other points of Sf, and deg(f)<=q1/4, then no three points of Sf are collinear, so that Sf is a hyperoval. We also determine all f(X) with deg(f)<=q1/4 for which Sf is a hyperoval, which strengthens a result that was proved by Caullery and Schmidt using entirely different methods.