On the difference between permutation polynomials over finite fields

Abstract

The well-known Chowla and Zassenhaus conjecture, proven by Cohen in 1990, states that if p>(d2-3d+4)2, then there is no complete mapping polynomial f in [x] of degree d 2. For arbitrary finite fields , a similar non-existence result is obtained recently by I s k, Topuzo glu and Winterhof in terms of the Carlitz rank of f. Cohen, Mullen and Shiue generalized the Chowla-Zassenhaus-Cohen Theorem significantly in 1995, by considering differences of permutation polynomials. More precisely, they showed that if f and f+g are both permutation polynomials of degree d 2 over , with p>(d2-3d+4)2, then the degree k of g satisfies k ≥ 3d/5, unless g is constant. In this article, assuming f and f+g are permutation polynomials in [x], we give lower bounds for k %=deg(h) in terms of the Carlitz rank of f and q. Our results generalize the above mentioned result of I s k et al. We also show for a special class of polynomials f of Carlitz rank n ≥ 1 that if f+xk is a permutation of , with (k+1, q-1)=1, then k≥ (q-n)/(n+3).