On a Class of Quadratic Polynomials with no Zeros and its Application to APN Functions

Abstract

We show that the there exists an infinite family of APN functions of the form F(x)=x2s+1 + x2k+s+2k + cx2k+s+1 + c2kx2k + 2s + δ x2k+1, over 22k, where k is an even integer and (2k,s)=1, 3 k. This is actually a proposed APN family of Lilya Budaghyan and Claude Carlet who show in carlet-1 that the function is APN when there exists c such that the polynomial y2s+1+cy2s+c2ky+1=0 has no solutions in the field 22k. In carlet-1 they demonstrate by computer that such elements c can be found over many fields, particularly when the degree of the field is not divisible by 3. We show that such c exists when k is even and 3 k (and demonstrate why the k odd case only re-describes an existing family of APN functions). The form of these coefficients is given so that we may write the infinite family of APN functions.