Determination of Some Types of Permutations over Fq2 with Low-Degree

Abstract

The characterization of permutations over finite fields is an important topic in number theory with a long-standing history. This paper presents a systematic investigation of low-degree bivariate polynomial systems F=(f1(x,y),f2(x,y)) defined over Fq2. Specifically, we employ Hermite's Criterion to completely classify bivariate quadratic permutation polynomial systems, while utilizing the theory of permutation rational functions to give a full classification of bivariate 3-homogeneous permutation polynomial systems. Furthermore, as an application of our findings, we provide an explicit characterization of the permutation binomials of the form x3+ax2q+1 over Fq2 with characteristic p≠3, thereby resolving a significant special case within this classical research domain.