Extending a result of Carlitz and McConnel to polynomials which are not permutations

Abstract

Let D denote the set of directions determined by the graph of a polynomial f of Fq[x], where q is a power of the prime p. If D is contained in a multiplicative subgroup M of Fq×, then by a result of Carlitz and McConnel it follows that f(x)=axpk+b for some k∈ N. Of course, if D⊂eq M, then 0 D and hence f is a permutation. If we assume the weaker condition D⊂eq M \0\, then f is not necessarily a permutation, but Sziklai conjectured that f(x)=axpk+b follows also in this case. When q is odd, and the index of M is even, then a result of Ball, Blokhuis, Brouwer, Storme and Sz onyi combined with a result of McGuire and G\"ologlu proves the conjecture. Assume f≥ 1. We prove that if the size of D-1D=\d-1d' : d∈ D \0\,\, d'∈ D\ is less than q- f+2, then f is a permutation of Fq. We use this result to verify the conjecture of Sziklai.