MPIM

Refined norm counting in quaternion algebrasMPIM

by Michael Daas (Universität Luxemburg/MPIM)

Europe/Berlin
MPIM, Vivatsgasse, 7 - Lecture Hall (Max Planck Institute for Mathematics)

MPIM, Vivatsgasse, 7 - Lecture Hall

Max Planck Institute for Mathematics

120
Description

PLeaSANT

Gross and Zagier related the differences between singular moduli to counting isomorphisms between the mod ell^n reductions of the CM elliptic curves under consideration. Later, Howard and Yang refined this by introducing the CM-degree of an isomorphism, which takes trace 1 values in a real quadratic field. At supersingular primes, the relevant endomorphism rings are orders in quaternion algebras, and the degree corresponds to the norm. In this talk, we explore the above, and explain how one can count elements in quaternion algebras with a given CM norm. This supports p-adic approaches to singular moduli on Shimura curves.