Primes in short arithmetic progressions
Abstract
Let x,h and Q be three parameters. We show that, for most moduli q Q and for most positive real numbers y x, every reduced arithmetic progression a q has approximately the expected number of primes p from the interval (y,y+h], provided that h>x1/6+ε and Q satisfies appropriate bounds in terms of h and x. Moreover, we prove that, for most moduli q Q and for most positive real numbers y x, there is at least one prime p∈(y,y+h] lying in every reduced arithmetic progression a q, provided that 1 Q2 h/x1/15+ε.
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