Normal points on Artin-Schreier curves over finite fields

Abstract

In 2022, S.D. Cohen and the two authors introduced and studied the concept of (r, n)-freeness on finite cyclic groups G for suitable integers r, n, which is an arithmetic way of capturing elements of special forms that lie in the subgroups of G. Combining this machinery with some character sum techniques, they explored the existence of points (x0, y0) on affine curves yn=f(x) defined over a finite field F whose coordinates are generators of the multiplicative cyclic group F*. In this paper we develop the natural additive counterpart of this work for finite fields. Namely, any finite extension E of a finite field F with Q elements is a cyclic F[x]-module induced by the Frobenius automorphism α αQ, and any generator of this module is said to be a normal element over F. We introduce and study the concept of (f, g)-freeness on this module structure for suitable polynomials f, g∈ F[x]. As a main application of the machinery developed in this paper, we study the existence of Fpn-rational points in the Artin-Schreier curve Af : yp-y=f(x) whose coordinates are normal over the prime field Fp and establish concrete results.

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