Solving x2k+1+x+a=0 in F2n with (n,k)=1

Abstract

Let Na be the number of solutions to the equation x2k+1+x+a=0 in n where (k,n)=1. In 2004, by Bluher BLUHER2004 it was known that possible values of Na are only 0, 1 and 3. In 2008, Helleseth and Kholosha HELLESETH2008 have got criteria for Na=1 and an explicit expression of the unique solution when (k,n)=1. In 2014, Bracken, Tan and Tan BRACKEN2014 presented a criterion for Na=0 when n is even and (k,n)=1. This paper completely solves this equation x2k+1+x+a=0 with only condition (n,k)=1. We explicitly calculate all possible zeros in n of Pa(x). New criterion for which a, Na is equal to 0, 1 or 3 is a by-product of our result.