Primitive elements with prescribed traces

Abstract

Given a prime power q and a positive integer n, let Fqn denote the finite field with qn elements. Also let a,b be arbitrary members of the ground field Fq. We investigate the existence of a non-zero element ∈ Fqn such that + -1 is primitive and T()=a, T(-1)=b, where T() denotes the trace of in Fq. This was a question intended to be addressed by Cao and Wang in 2014. Their work dealt instead with another problem already in the literature. Our solution deals with all values of n ≥ 5. A related study involves the cubic extension Fq3 of Fq. We show that if q≥ 8· 1012 then, for any a∈ Fq we can find a primitive element ∈ Fq3 such that + -1 is also a primitive element of Fq3, and for which the trace of is equal to a. The improves a result of Cohen and Gupta. Along the way we prove a hybridised lower bound on prime divisors in various residue classes, which may be of interest to related existence questions.

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