Skip to main content

Exact critical values of a symmetric fourth $L$-function and Zagier's conjecture

Posted in
Speaker: 
Tomoyoshi Ibukiyama
Zugehörigkeit: 
Osaka University
Datum: 
Sam, 2011-06-25 10:15 - 11:15

Around 1977, Don Zagier conjectured exact critical values of the symmetric fourth $L$-function of the Ramanujan $\Delta$ function, expressing them by explicit rational numbers, power of $\pi$, and the inner product of $\Delta$, based on numerical calculations and Deligne's conjectures.
In this talk, we will give their explicit exact values (with proof), using Siegel modular forms, pullback formulas, and differential operators. This is a joint work with H. Katsurada.
We also talk shortly on some congruence and a theory of differential operators on Siegel modular forms.

© MPI f. Mathematik, Bonn Impressum & Datenschutz
-A A +A