Frobenius linear translators giving rise to new infinite classes of permutations and bent functions

TL;DR

This paper introduces Frobenius translators to generate new classes of permutations and bent functions over finite fields, extending existing theories and solving open problems in the field.

Contribution

It extends the notion of linear translators to Frobenius translators, providing new infinite classes of permutations and bent functions, and addresses open problems related to their existence and properties.

Findings

Established the existence of many new infinite classes of permutations.

Solved open problems regarding classical linear translators and bent functions.

Identified new permutation families and constructed new bent functions.

Abstract

We show the existence of many infinite classes of permutations over finite fields and bent functions by extending the notion of linear translators, introduced by Kyureghyan [12]. We call these translators Frobenius translators since the derivatives of $f : F_{p^n} \rightarrow F_{p^k}$, where $n = rk$, are of the form $f(x + u\phi) - f(x) = u^{p^i}b$, for a fixed $b \in F_{p^k}$ and all $u \in F_{p^k}$, rather than considering the standard case corresponding to $i = 0$. This considerably extends a rather rare family {f} admitting linear translators of the above form. Furthermore, we solve a few open problems in the recent article [4] concerning the existence and an exact specification of $f$ admitting classical linear translators, and an open problem introduced in [9] of finding a triple of bent functions $f_1, f_2, f_3$ such that their sum $f_4$ is bent and that the sum of their duals $f_1* +f_2* +f_3* +f_4* = 1$. Finally, we also specify two huge families of permutations over $F_{p^n}$ related to the condition that $G(y) = -L(y)+(y+\delta)^s -(y+\delta)^{p^ks}$ permutes the set $S =\{\beta \in F_{p^n} : Tr^n_k(\beta) = 0\}$, where $n = 2k$ and $p > 2$. Finally, we offer generalizations of constructions of bent functions from [16] and described some new bent families using the permutations found in [4].