TRR 358; TP A04: Combinatorial Euler products
Overview
Euler products are the incarnation of local-global principles. They often arise as leading constants of an asymptotic formula describing a counting problem in algebra or number theory, and they encode the underlying integral structures. Prototypes are the conjectures of Manin and Malle. The Euler products and their associated zeta functions investigated in this project come from a variety of mathematical fields including graph theory, algebraic geometry, representation theory and algebraic number theory.
Key Facts
- Grant Number:
- Project type:
- Forschung
- Project duration:
- 01/2023 - 12/2026
- Funded by:
- Deutsche Forschungsgemeinschaft (DFG)
