Fq-primitive points on varieties over finite fields
Abstract
Let r be a positive divisor of q-1 and f(x,y) a rational function of degree sum d over Fq with some restrictions, where the degree sum of a rational function f(x,y) = f1(x,y)/f2(x,y) is the sum of the degrees of f1(x,y) and f2(x,y). In this article, we discuss the existence of triples (α, β, f(α, β)) over Fq, where α, β are primitive and f(α, β) is an r-primitive element of Fq. In particular, this implies the existence of Fq-primitive points on the surfaces of the form zr = f(x,y). As an example, we apply our results on the unit sphere over Fq.
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