Higher Lie theory

Aim and scope

For finite dimensional real Lie algebras, the integration theorems of Lie and Cartan give satisfying answers regarding the integration of objects, morphisms, and subobjects. A number of generalizations of Lie algebras have been considered: infinite dimensional Lie algebras, Leibniz algebras, Lie infinity algebras, categorified and oidified Lie algebras… In all these cases, similar integration problems have been and are still being intensively studied.

The aim of this workshop is to give a broad view of current research and new trends in higher Lie theory, with an emphasis on integration problems and related topics.

Mini-course

Friedrich Wagemann (University of Nantes)
Integration of Leibniz algebras

Speakers

Camilo Arias Abad (University of Zurich)
Simon Covez (University of Strasbourg)
Michał Jóźwikowski (Institute of Mathematics, Polish Academy of Sciences, Warsaw)
Yvette Kosmann-Schwarzbach (Ecole Polytechnique, Palaiseau)
Olga Kravchenko (University of Lyon)
Chris Rogers (University of Göttingen)
Dmitry Roytenberg (University of Utrecht and University of Nijmegen)
Christopher Schommer-Pries (Max Planck Institute, Bonn)
Urs Schreiber (University of Nijmegen)
Pavol Ševera (University of Geneva)
Zoran Škoda (University of Zagreb)
Marco Zambon (Universidad Autonoma de Madrid)
Chenchang Zhu (University of Göttingen)

Scientific committee

Anton Alekseev (University of Geneva)
Yvette Kosmann-Schwarzbach (Ecole Polytechnique, Palaiseau)
Norbert Poncin (University of Luxembourg)
Zoran Škoda (University of Zagreb)

Organizing committee

Benoît Jubin (University of Luxembourg)
Norbert Poncin (University of Luxembourg)

Contact

For more information, contact Benoît Jubin.