Primitive values of quadratic polynomials in a finite field
Abstract
We prove that for all q>211, there always exists a primitive root g in the finite field Fq such that Q(g) is also a primitive root, where Q(x)= ax2 + bx + c is a quadratic polynomial with a, b, c∈ Fq such that b2 - 4ac ≠ 0.
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