Primes in arithmetic progressions under the presence of Landau-Siegel zeroes

Abstract

Let x≥slant 2 and assume that a and q are coprime positive integers. As usual, (x;q,a):=Σn≤slant x,n a(\!\!\!\!\!q)(n), where is the von Mangoldt function. In 2003, Friedlander and Iwaniec assumed the existence of exceptional characters corresponding to "extreme" Landau-Siegel zeroes and established a meaningful asymptotic formula for (x;q,a) beyond the square-root barrier of the Generalized Riemann Hypothesis. In particular, their asymptotic yields non-trivial information for moduli q≤slant x1/2+1/231. In this paper, we considerably relax the extremity of the Landau-Siegel zero required in the work of Friedlander and Iwaniec and obtain a conditional asymptotic formula for (x;q,a) in a slightly wider range of q.

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