on a conjecture on permutation rational functions over finite fields

Abstract

Let p be a prime and n be a positive integer, and consider fb(X)=X+(Xp-X+b)-1∈ Fp(X), where b∈ Fpn is such that Trpn/p(b) 0. It is known that (i) fb permutes Fpn for p=2,3 and all n 1; (ii) for p>3 and n=2, fb permutes Fp2 if and only if Trp2/p(b)= 1; and (iii) for p>3 and n 5, fb does not permute Fpn. It has been conjectured that for p>3 and n=3,4, fb does not permute Fpn. We prove this conjecture for sufficiently large p.