Explicit bounds for small prime nonresidues
Abstract
Let be a Dirichlet character modulo a prime~p. We give explicit upper bounds on q1<q2<…<qn, the n smallest prime nonresidues of . More precisely, given n0 and p0 there exists an absolute constant C=C(n0,p0)>0 such that qn≤ Cp14( p)n+12 whenever n≤ n0 and p≥ p0.
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