On the Equation x2l+1+x+a=0 over GF(2k) (Extended Version)

Abstract

In this paper, the polynomials Pa(x)=x2l+1+x+a with a∈GF(2k) are studied. New criteria for the number of zeros of Pa(x) in GF(2k) are proved. In particular, a criterion for Pa(x) to have exactly one zero in GF(2k) when (l,k)=1 is formulated in terms of the values of permutation polynomials introduced by Dobbertin. We also study the affine polynomial a2lx22l+x2l+ax+1 which is closely related to Pa(x). In many cases, explicit expressions for calculating zeros of these polynomials are provided.