On the number of elements with prescribed norm and trace

Abstract

Let Fq be the finite field with cardinality q, where q is a prime power. Given a finite field extension Fqn over Fq and a,b in (Fq)*, we investigate in this article the number Nn(a,b) of elements in Fqn whose norm equals a and trace equals b. Our approach to probe Nn(a,b) is to connect it with the number of rational points on certain Artin-Schreier curve. After establish an improvement of the Hasse-Weil bound for that Artin-Schreier curve, we improve the known estimates for Nn(a,b) when (roughly speaking) n ≥ q-1. Moreover, we use this approach to improve the bound given by Moisio and Wan for the number of rational points on the toric Calabi-Yau variety studied by Rojas-Leon and Wan in 2011. We finish the paper with explicit calculations of Nn(a,b) and an application to the number of irreducible monic polynomials in an arithmetic progression.