A few more functions that are not APN infinitely often

Abstract

We consider exceptional APN functions on F2m, which by definition are functions that are not APN on infinitely many extensions of F2m. Our main result is that polynomial functions of odd degree are not exceptional, provided the degree is not a Gold member (2k+1) or a Kasami-Welch number (4k-2k+1). We also have partial results on functions of even degree, and functions that have degree 2k+1.