Towards the classification of scattered binomials

Abstract

Let \( q \) be a prime power and \( n \) an integer. An \( Fq \)-linearized polynomial \( f \) is said to be scattered if it satisfies the condition that for all \( x, y ∈ Fqn \ 0 \ \), whenever \( f(x)x = f(y)y \), it follows that \( xy ∈ Fq \). 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) = δ xqs + xqn-s, and the one from Csajb\'ok, Marino, Polverino, and Zanella (CMPZ), given by f(x) = δ xqs + xqs + 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 when n≤8 and q is large enough.

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