New scattered linearized quadrinomials
Abstract
Let be integers, where is a divisor of . An R--partially scattered polynomial is a -linearized polynomial in that satisfies the condition that for all such that , if , then ; is called scattered if this implication holds for all . Two polynomials in are said to be equivalent if their graphs are in the same orbit under the action of the group . For only three families of scattered polynomials in are known: ~monomials of pseudoregulus type, ~binomials of Lunardon-Polverino type, and ~a family of quadrinomials defined in [1,10] and extended in [8,13]. In this paper we prove that the polynomial , odd, is R--partially scattered for every value of and coprime with . Moreover, for every and there exist values of for which is scattered and new with respect to the polynomials mentioned in , and above. The related linear sets are of -class at least two.
Cite
@article{arxiv.2402.14742,
title = {New scattered linearized quadrinomials},
author = {Valentino Smaldore and Corrado Zanella and Ferdinando Zullo},
journal= {arXiv preprint arXiv:2402.14742},
year = {2024}
}