On the Brun--Titchmarsh theorem. II
Abstract
Denote by π(x;q,a) the number of primes p≤slant x with p a q. We prove new upper bounds for π(x;q,a) when q is a large prime very close to x, improving upon the classical work of Iwaniec (1982). The proof reduces to bounding a quintilinear sum of Kloosterman sums, to which we introduce a new shifting argument inspired by Vinogradov--Burgess--Karatsuba, going beyond the classical Fourier-analytic approach thanks to a deep algebro-geometric result of Kowalski--Michel--Sawin on sums of products of Kloosterman sums.
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