Primitive normal pairs of elements with one prescribed trace

Abstract

Let q, n, m ∈ N such that q is a prime power, m ≥ 3 and a ∈ F. We establish a sufficient condition for the existence of a primitive normal pair (α, f(α)) in Fqm over Fq such that TrFqm/Fq(α-1)=a, where f(x) ∈ Fqm(x) is a rational function with degree sum n. In particular, for q=5k, ~k ≥ 5 and degree sum n=4, we explicitly find at most 11 choices of (q, m) where existence of such pairs is not guaranteed.