Improving bounds for value sets of polynomials over finite fields
Abstract
Let Fq be a finite field of characteristic p, and let f ∈ Fq[x] be a polynomial of degree d > 0. Denote the image set of this polynomial as Vf=\f(α)α∈Fq\ and denote the cardinality of this set as Nf. A much sharper bound for Nf is established in this paper. In particular, for any p≠ 2, 3, and for nearly every generic quartic polynomial f ∈ Fq[x], we obtain Nf - 58 q ≤ 12q + 154, which holds as a simple corollary of the main result.
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