Permutation Polynomials of the form Xr(a+ X2(q-1)) --- A Nonexistence Result

Abstract

Let f= Xr(a+ X2(q-1))∈ Fq2[ X], where a∈ Fq2* and r 1. The parameters (q,r,a) for which f is a permutation polynomial (PP) of Fq2 have been determined in the following cases: (i) aq+1=1; (ii) r=1; (iii) r=3. These parameters together form three infinite families. For r>3 (there is a good reason not to consider r=2) and aq+1 1, computer search suggested that f is not a PP of Fq2 when q is not too small relative to r. In the present paper, we prove that this claim is true. In particular, for each r>3, there are only finitely many (q,a), where aq+1 1, for which f is a PP of Fq2.