Permutation Polynomials of Fq2 of the form a X+ Xr(q-1)+1

Abstract

Let q be a prime power, 2 r q, and f=a X+ Xr(q-1)+1∈ Fq2[ X], where a 0. The conditions on r,q,a that are necessary and sufficient for f to be a permutation polynomial (PP) of Fq2 are not known. (Such conditions are known under an additional assumption that aq+1=1.) In this paper, we prove the following: (i) If f is a PP of Fq2, then gcd(r,q+1)>1 and (-a)(q+1)/gcd(r,q+1) 1. (ii) For a fixed r>2 and subject to the conditions that q+1 0 r and aq+1 1, there are only finitely many (q,a) for which f is a PP of Fq2. Combining (i) and (ii) confirms a recent conjecture regarding the type of permutation binomial considered here.