New scattered linearized quadrinomials

Abstract

Let 1<t<n be integers, where t is a divisor of n. An R-qt-partially scattered polynomial is a Fq-linearized polynomial f in Fqn[X] that satisfies the condition that for all x,y∈ Fqn* such that x/y∈ Fqt, if f(x)/x=f(y)/y, then x/y∈ Fq; f is called scattered if this implication holds for all x,y∈ Fqn*. Two polynomials in Fqn[X] are said to be equivalent if their graphs are in the same orbit under the action of the group L(2,qn). For n>8 only three families of scattered polynomials in Fqn[X] are known: (i)~monomials of pseudoregulus type, (ii)~binomials of Lunardon-Polverino type, and (iii)~a family of quadrinomials defined in [1,10] and extended in [8,13]. In this paper we prove that the polynomial m,qJ=XqJ(t-1)+XqJ(2t-1)+m(XqJ-XqJ(t+1))∈ Fq2t[X], q odd, t3 is R-qt-partially scattered for every value of m∈ Fqt* and J coprime with 2t. Moreover, for every t>4 and q>5 there exist values of m for which m,q is scattered and new with respect to the polynomials mentioned in (i), (ii) and (iii) above. The related linear sets are of L-class at least two.