Permutation polynomials of degree 8 over finite fields of odd characteristic

Abstract

This paper provides an algorithmic generalization of Dickson's method of classifying permutation polynomials (PPs) of a given degree d over finite fields. Dickson's idea is to formulate from Hermite's criterion several polynomial equations satisfied by the coefficients of an arbitrary PP of degree d. Previous classifications of PPs of degree at most 6 were essentially deduced from manual analysis of these polynomial equations. However, these polynomials, needed for that purpose when d>6, are too complicated to solve. Our idea is to make them more solvable by calculating some radicals of ideals generated by them, implemented by a computer algebra system (CAS). Our algorithms running in SageMath 8.6 on a personal computer work very fast to determine all PPs of degree 8 over an arbitrary finite field of odd order q>8. The main result is that for an odd prime power q>8, a PP f of degree 8 exists over the finite field of order q if and only if q≤slant 31 and q 1\ (mod\ 8), and f is explicitly listed up to linear transformations.