Tropical and Convex Geometry and Feynman integrals

Workshop from 05 - 09 September 2022

In recent years, convex and tropical geometry have been recognized as playing key roles in several areas of mathematical physics. In particular, the theory of Feynman integrals in particle physics is related to Euler-Mellin integrals, geometric sector decomposition, stringy canonical integrals, GKZ systems, singularities, their regularization and Newton polytopes of graph polynomials. All of these aspects have connections to convex and tropical geometry. The goal of this workshop is to bring together mathematicians and physicists, in order to identify the precise relations and potential for applying tools and results from one domain in the other.

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Confirmed Speakers: Sumit Banik (Indian Institute of Science), Claudia Fevola (Max-Planck-Institut, Leipzig), Aaron Hillman (Princeton University), René Klausen (Humboldt-Universität zu Berlin), Florian Loebbert (University of Bonn), Yao Ma (University of Edinburgh), Sebastian Mizera (Institute for Advanced Study, Princeton), Henrik Munch (University of Padova), Christoph Nega (University of Bonn), Johannes Schlenk (Paul Scherrer Institut, Villigen), Simon Telen (Max-Planck-Institut, Leipzig), Felix Tellander (Deutsches Elektronen-Synchrotron DESY, Hamburg), Uli Walther (Purdue University), Francesca Zaffalon (Ghent University)

Click Download here (PDF, 80 KB) to see the workshop schedule

Click Download here (PDF, 167 KB) to see the list of titles and abstracts

 

Please note that registration is required for this event and participation is limited

Workshop Impressions

Location

Room CLA E4, Tannenstrasse 3, 8092 Zürich

Click here for more details. 

Organizers

Michael Borinsky, ETH Institute for Theoretical Studies

Erik Panzer, University of Oxford

Contact address

administration@eth-​its.ethz.ch

Local information

Gastronomy

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