Primes in arithmetic progressions
Primes in arithmetic progressions
Register at: https://math.princeton.edu/minerva-2021
How many primes are there in an arithmetic progression $a\mod{q}$? Dirichlet's theorem shows that the primes are roughly equidistributed for $a$ coprime to $q$, and the Generalized Riemann Hypothesis (GRH) would imply this equidistribution occurs whenever $q$ is smaller than the square-root of the size of the primes. Unfortunately we don't know how to prove the GRH, but the Bombieri-Vinogradov Theorem shows that the GRH holds 'on average' and often serves as an adequate unconditional substitute.
We will talk about new work which extends the Bombieri-Vinogradov Theorem beyond the 'square-root barrier' implying equidistribution results for primes in regions out of direct reach of the Riemann Hypothesis, extending work of Bombieri,Friedlander,Fouvry,Iwaniec and Zhang. This rests on a fun combination of ideas from algebraic geometry, the spectral theory of automorphic forms, and classical analytic number theory.