Primitive pairs of rational functions 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 a non-zero element ε ∈ Fqm, such that (f(ε), g(ε)) is a primitive pair in Fqm with two prescribed traces, Fqm/Fq(ε)=a and Fqm/Fq(ε-1)=b, where f(x), g(x) ∈ Fqm(x) are rational functions with some restrictions and a, b ∈ Fq. Also, we show that there exists an element ε ∈ Fqm satisfying our desired properties in all but finitely many fields Fqm over Fq. We also calculate possible exceptional pairs explicitly for m≥ 9, when degree sums of both the rational functions are taken to be 3.
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