Large classes of permutation polynomials over $\mathbb{F}_{q^2}$ (1510.02021v3)
Abstract: Permutation polynomials (PPs) of the form $(x{q} -x + c){\frac{q2 -1}{3}+1} +x$ over $\mathbb{F}{q2}$ were presented by Li, Helleseth and Tang [Finite Fields Appl. 22 (2013) 16--23]. More recently, we have constructed PPs of the form $(x{q} +bx + c){\frac{q2 -1}{d}+1} -bx$ over $\mathbb{F}{q2}$, where $d=2, 3, 4, 6$ [Finite Fields Appl. 35 (2015) 215--230]. In this paper we concentrate our efforts on the PPs of more general form [ f(x)=(ax{q} +bx +c)r \phi((ax{q} +bx +c){(q2 -1)/d}) +ux{q} +vx~~\text{over $\mathbb{F}{q2}$}, ] where $a,b,c,u,v \in \mathbb{F}{q2}$, $r \in \mathbb{Z}{+}$, $\phi(x)\in \mathbb{F}{q2}[x]$ and $d$ is an arbitrary positive divisor of $q2-1$. The key step is the construction of a commutative diagram with specific properties, which is the basis of the Akbary--Ghioca--Wang (AGW) criterion. By employing the AGW criterion two times, we reduce the problem of determining whether $f(x)$ permutes $\mathbb{F}{q2}$ to that of verifying whether two more polynomials permute two subsets of $\mathbb{F}{q2}$. As a consequence, we find a series of simple conditions for $f(x)$ to be a PP of $\mathbb{F}{q2}$. These results unify and generalize some known classes of PPs.