Minimal Value Set Polynomials

Abstract

A well-known problem in the theory of polynomials over finite fields is the characterization of minimal value set polynomials (MVSPs) over the finite field Fq, where q = pn. These are the nonconstant polynomials F ∈ Fq[x] whose value set VF = \F(a) : a ∈ Fq\ has the smallest possible size, namely q(F) . In this paper, we describe the family Aq of all subsets S ⊂eq Fq with \# S>2 that can be realized as the value set of an MVSP F ∈ Fq[x]. Affine subspaces of Fq are a fundamental type of set in Aq, and we provide the complete list of all MVSPs with such value sets. Building on this, we present a conjecture that characterizes all MVSPs F ∈ Fq[x] with VF=S for any S ∈ Aq. The conjecture is confirmed by prior results for q ∈\p, p2, p3\ or \# S ≥ pn / 2, and additional instances, including the cases for q=p4 and \# S>pn / 2-1, are proved. We further show that the conjecture leads to the complete characterization of the Fq-Frobenius nonclassical curves of type yd=f(x), which we establish as a theorem for q=p4.