On the Chowla and twin primes conjectures over Fq[T]

Abstract

Using geometric methods, we improve on the function field version of the Burgess bound, and show that, when restricted to certain special subspaces, the M\"obius function over Fq[T] can be mimicked by Dirichlet characters. Combining these, we obtain a level of distribution close to 1 for the M\"obius function in arithmetic progressions, and resolve Chowla's k-point correlation conjecture with large uniformity in the shifts. Using a function field variant of a result by Fouvry-Michel on exponential sums involving the M\"obius function, we obtain a level of distribution beyond 1/2 for irreducible polynomials, and establish the twin prime conjecture in a quantitative form. All these results hold for finite fields satisfying a simple condition.