2022 Spring

PhD Student

Wojtek Wawrow is a PhD student at the London School of Geometry and Number Theory. His main interests are arithmetic geometry and its many flavors, like non-Archimedean geometry. He is currently working under the supervision of Sarah Zerbes on topics related to the Bloch-Kato conjecture.

Sarah Zerbes

Professor

Sarah Livia Zerbes is a German algebraic number theorist at ETH Zurich. Her research interests include L-functions, modular forms, p-adic Hodge theory, and Iwasawa theory, and her work has led to new insights towards the Birch and Swinnerton-Dyer conjecture, which predicts the number of rational points on an elliptic curve by the behavior of an associated L-function.

2022.04.27. - 2022.04.27.

Sarah Zerbes: Euler systems and the Birch--Swinnerton-Dyer conjecture

Rényi Institute, Main Lecture Hall

15.15-16.00: Reception

16.00-16.45: Introductory talk by Wojtek Wawrow: Special values of L-functions

17.00-18.00: Main lecture

Abstracts are available here.

Keshav Aggarwal

Postdoctoral Fellow

Keshav Aggarwal is a postdoctoral researcher at the Alfréd Rényi Institute of Mathematics. His research lies in analytic number theory, with a focus on the study of L-functions using classical tools like the circle method and harmonic analysis.

Tamás Titkos

Research Fellow

Tamás Titkos is a research fellow of the MTA-Rényi "Momentum" Optimal Transport and Quantum Information Geometry Research Group. He is interested in functional analysis and optimal transport, in particular in the geometry of Wasserstein spaces.

Dániel Virosztek

Research Fellow

Dániel Virosztek works in functional analysis with expertise in quantum information theory. Currently, he is interested in the geometric aspects of classical and quantum optimal transport.

Lorenzo Portinale

Postdoctoral Fellow

Lorenzo Portinale works in the field of commutative and noncommutative optimal transport, with particular attention to the connections to evolution equations and gradient flows.