Primitive normal pairs with prescribed traces over finite fields
Abstract
Let q be a positive integral power of some prime p and Fqm be a finite field with qm elements for some m ∈ N. Here we establish a sufficient condition for the existence of primitive normal pairs of the type (ε, f(ε)) in Fqm over Fq with two prescribed traces, TrFqm/Fq(ε)=a and TrFqm/Fq(f(ε))=b, where f(x) ∈ Fqm(x) is a rational function with some restrictions and a, b ∈ Fq. Furthermore, for q=5k, m ≥ 9 and rational functions with degree sum 4, we explicitly find at most 12 fields in which the desired pair may not exist.
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