English

A condition for scattered linearized polynomials involving Dickson matrices

Combinatorics 2020-09-25 v1

Abstract

A linearized polynomial over Fqn\mathbb F_{q^n} is called scattered when for any t,xFqnt,x\in\mathbb F_{q^n}, the condition xf(t)tf(x)=0xf(t)-tf(x)=0 holds if and only if xx and tt are Fq\mathbb F_q-linearly dependent. General conditions for linearized polynomials over Fqn\mathbb F_{q^n} to be scattered can be deduced from the recent results in [4,7,15,19]. Some of them are based on the Dickson matrix associated with a linearized polynomial. Here a new condition involving Dickson matrices is stated. This condition is then applied to the Lunardon-Polverino binomial xqs+δxqnsx^{q^s}+\delta x^{q^{n-s}}, allowing to prove that for any nn and ss, if Nqn/q(δ)=1\mathbb N_{q^n/q}(\delta)=1, then the binomial is not scattered. Also, a necessary and sufficient condition for xqs+bxq2sx^{q^s}+bx^{q^{2s}} to be scattered is shown which is stated in terms of a special plane algebraic curve.

Keywords

Cite

@article{arxiv.1909.07802,
  title  = {A condition for scattered linearized polynomials involving Dickson matrices},
  author = {Corrado Zanella},
  journal= {arXiv preprint arXiv:1909.07802},
  year   = {2020}
}
R2 v1 2026-06-23T11:17:55.393Z