Scattered trinomials of $\mathbb{F}_{q^6}[X]$ in even characteristic

TL;DR

This paper investigates scattered trinomials over finite fields of even characteristic, providing new conditions for their existence, and demonstrates that associated codes and linear sets are novel compared to prior work.

Contribution

The authors establish new criteria for scattered trinomials in even characteristic and show these lead to previously unknown MRD-codes and linear sets.

Findings

Approximately q^3 elements c make the trinomial scattered for large q

The new codes and linear sets are not equivalent to known constructions

Existence of scattered trinomials in even characteristic under new conditions

Abstract

In recent years, several families of scattered polynomials have been investigated in the literature. However, most of them only exist in odd characteristic. In [B. Csajb\'ok, G. Marino and F. Zullo: New maximum scattered linear sets of the projective line, Finite Fields Appl. 54 (2018), 133-150; G. Marino, M. Montanucci and F. Zullo: MRD-codes arising from the trinomial $x^q+x^{q^3}+cx^{q^5}\in\mathbb{F}_{q^6}[x]$, Linear Algebra Appl. 591 (2020), 99-114], the authors proved that the trinomial $f_c(X)=X^{q}+X^{q^{3}}+cX^{q^{5}}$ of $\mathbb{F}_{q^6}[X]$ is scattered under the assumptions that $q$ is odd and $c^2+c=1$. They also explicitly observed that this is false when $q$ is even. In this paper, we provide a different set of conditions on $c$ for which this trinomial is scattered in the case of even $q$. Using tools of algebraic geometry in positive characteristic, we show that when $q$ is even and sufficiently large, there are roughly $q^3$ elements $c \in \mathbb{F}_{q^6}$ such that $f_{c}(X)$ is scattered. Also, we prove that the corresponding MRD-codes and $\mathbb{F}_q$-linear sets of $\mathrm{PG}(1,q^6)$ are not equivalent to the previously known ones.