Talk page

Title:
Moments in the Chebotarev density theorem

Speaker:
Florent Jouve

Abstract:
In joint work with Régis de la Bretéche and Daniel Fiorilli, we consider weighted moments for the distribution of Frobenius substitutions in conjugacy classes of Galois groups of normal number field extensions. The question is inspired by work of Hooley and recent progress by de la Bretéche–Fiorilli in the case of moments for primes in arithmetic progressions. As in their work, the results I will discuss are conditional on the Riemann Hypothesis and confirm that the moments considered should be Gaussian. Time permitting, I will address a different notion of moments that can be considered in the same context and that leads to non-Gaussian families for particular Galois group structures.

Link:
https://mathtube.org/lecture/video/moments-chebotarev-density-theorem

Workshop:
Mathtube- Comparative Prime Number Theory