Project Details
Projekt
Arithmetic of superelliptic curves
Applicant
Professor Dr. Ulf Kühn
Subject Area
Mathematics
Term
from 2011 to 2016
Project identifier
Deutsche Forschungsgemeinschaft (DFG) - Project number 203526262
In this project we want to estimate the arithmetic self intersection number ω-2 Ar of the relative dualizing sheaf varying in discrete families of arithmetic surfaces associated to superelliptic curves defined over number fields with fixed ramification. In general such estimates are of great interest in arithmetic intersection theory, since these invariants are intimately related to other major problems in arithmetic geometry, such as the effective Mordell conjecture or special values of L-series, but there are very few classes of curves for which estimates, or even bounds, on ω-2Ar are known. In order to obtain such estimates, we plan to compute upper bounds using a theorem of the applicant and lower bounds using techniques due to Zhang.
DFG Programme
Research Grants
