Quadratic non-residues and non-primitive roots satisfying a coprimality condition
Abstract
Let q≥ 1 be any integer and let ε ∈ [111, 12) be a given real number. In this short note, we prove that for all primes p satisfying p 1q, p > 6.8312-ε and φ(p-1)p-1 ≤ 12 - ε, there exists a quadratic non-residue g which is not a primitive root modulo p such that gcd(g, p-1q) = 1.
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