Towards the classification of scattered binomials

TL;DR

This paper classifies scattered binomials over finite fields, showing that for large q and prime n, only known forms are scattered, and provides a complete classification for n ≤ 8.

Contribution

It proves necessary conditions for binomials to be scattered and classifies all scattered binomials for n ≤ 8 when q is large enough.

Findings

When q is large and n is prime, scattered binomials are only of the known LP form.

Complete classification of scattered binomials for n ≤ 8 and large q.

Necessary conditions for binomials to be scattered using algebraic varieties.

Abstract

Let \( q \) be a prime power and \( n \) an integer. An \( \mathbb{F}_q \)-linearized polynomial \( f \) is said to be scattered if it satisfies the condition that for all \( x, y \in \mathbb{F}_q^n \setminus \{ 0 \} \), whenever \( \frac{f(x)}{x} = \frac{f(y)}{y} \), it follows that \( \frac{x}{y} \in \mathbb{F}_q \). In this paper, we focus on scattered binomials. Two families of scattered binomials are currently known: the one from Lunardon and Polverino (LP), given by $f(x) = \delta x^{q^s} + x^{q^{n-s}},$ and the one from Csajb\'ok, Marino, Polverino, and Zanella (CMPZ), given by $f(x) = \delta x^{q^s} + x^{q^{s + n/2}},$ where \( n = 6 \) or \( n = 8 \). Using algebraic varieties as a tool, we prove some necessary conditions for a binomial to be scattered. As a corollary, we obtain that when \( q \) is sufficiently large and \( n \) is prime, a binomial is scattered if and only if it is of the form (LP). Moreover we obtain a complete classification of scattered binomial in $\Fn$ when $n\leq8$ and $q$ is large enough.