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 , where . These are the nonconstant polynomials whose value set has the smallest possible size, namely . In this paper, we describe the family of all subsets with that can be realized as the value set of an MVSP . Affine subspaces of are a fundamental type of set in , and we provide the complete list of all MVSPs with such value sets. Building on this, we present a conjecture that characterizes all MVSPs with for any . The conjecture is confirmed by prior results for or , and additional instances, including the cases for and , are proved. We further show that the conjecture leads to the complete characterization of the -Frobenius nonclassical curves of type , which we establish as a theorem for .
Keywords
Cite
@article{arxiv.2508.07113,
title = {Minimal Value Set Polynomials},
author = {Herivelto Borges and Lucas Reis},
journal= {arXiv preprint arXiv:2508.07113},
year = {2025}
}