Permutation polynomials of finite fields

Abstract

Let Fq be the finite field of q elements. Then a permutation polynomial (PP) of Fq is a polynomial f ∈ Fq[x] such that the associated function c f(c) is a permutation of the elements of Fq. In 1897 Dickson gave what he claimed to be a complete list of PPs of degree at most 6, however there have been suggestions recently that this classification might be incomplete. Unfortunately, Dickson's claim of a full characterisation is not easily verified because his published proof is difficult to follow. This is mainly due to antiquated terminology. In this project we present a full reconstruction of the classification of degree 6 PPs, which combined with a recent paper by Li et al. finally puts to rest the characterisation problem of PPs of degree up to 6. In addition, we give a survey of the major results on PPs since Dickson's 1897 paper. Particular emphasis is placed on the proof of the so-called Carlitz Conjecture, which states that if q is odd and `large' and n is even then there are no PPs of degree n. This important result was resolved in the affirmative by research spanning three decades. A generalisation of Carlitz's conjecture due to Mullen proposes that if q is odd and `large' and n is even then no polynomial of degree n is `close' to being a PP. This has remained an unresolved problem in published literature. We provide a counterexample to Mullen's conjecture, and also point out how recent results imply a more general version of this statement (provided one increases what is meant by q being `large').