Sergei V. Konyagin, Igor E. Shparlinski
Published 2013-11-27Version 1
We use the Burgess bound and combinatorial sieve to obtain an upper bound on the number of primes $p$ in a dyadic interval $[Q,2Q]$ for which a given interval $[u+1,u+\psi(Q)]$ does not contain a quadratic non-residue modulo $p$. The bound is nontrivial for any function $\psi(Q)\to\infty$ as $Q\to\infty$. This is an analogue of the well known estimates on the smallest quadratic non-residue modulo $p$ on average over primes $p$, which corresponds to the choice $u=0$.
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The variance of the number of prime polynomials in short intervals and in residue classes
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