Geometric class field theory and Cartier duality
Justin Campbell (Caltech)
Abstract: I will explain a generalized Albanese property for smooth curves, which implies Deligne's geometric class field theory with arbitrary ramification. The proof essentially reduces to some well-known Cartier duality statements. This is joint work with Andreas Hayash.
mathematical physicsalgebraic geometryrepresentation theory
Audience: researchers in the topic
Geometric Representation Theory conference
Series comments: Originally planned as a twinned conference held simultaneously at the Max Planck Institute in Bonn, Germany and the Perimeter Institute in Waterloo, Canada. The concept was motivated by the desire to reduce the environmental impact of conference travels. In order to view the talks, register at the website: www.mpim-bonn.mpg.de/grt2020 . The talks from previous days can be be viewed at pirsa.org/C20030 ; slides from the talks are posted here: www.dropbox.com/sh/cjzqbqn7ql8zcjv/AAANB82Hh4t5XDc5RPcZzW0Aa?dl=0
| Organizers: | Tobias Barthel, André Henriques*, Joel Kamnitzer, Carl Mautner, Aaron Mazel-Gee, Kevin Mcgerty, Catharina Stroppel, Ben Webster* |
| *contact for this listing |