Description
Symmetry is a central unifying theme in mathematics and physics. This Action focusses on symmetries realized through Lie groups and Lie algebras. In addition to the spectacular achievements in representation theory, and differential geometry, Lie theory is also exceptionally important for the formalization of fundamental physical theories. CaLISTA aims to advance cutting-edge research in mathematics and physics through a systematic application of the ideas and philosophy of Cartan geometry, a thoroughly Lie theoretic approach to differential geometry. In addition to making major progress in Cartan geometry itself, CaLISTA aims to develop crucial applications to integrable systems and supersymmetric gauge theories. Quantum groups and their quantum homogeneous spaces come into the play as a bridge between these topics: quantum groups stem originally from the R-matrix formulation in integrable systems, and their homogeneous spaces offer prototypical examples of noncommutative parabolic geometries. Parabolic geometry is the first and possibly the most important example of Cartan geometry, and one of the main aims of CaLISTA is to obtain a quantum generalization.
Surprisingly, Lie theory and Cartan geometry play a role in an exciting new interpretation of the differential structure, and related dynamics, of models for popular algorithms of vision like Deep Learning and the more recent Geometric Deep Learning. CaLISTA aims to investigate and improve on these techniques. CaLISTA will provide essential mathematical models with far-reaching applications, placing Europe among the leading actors in these innovative research areas.
Action keywords
Lie Theory - Cartan Geometry - Quantum Groups - Integrable Systems - Vision
Management Committee
Country | MC Member |
---|---|
Austria | |
Belgium | |
Belgium | |
Bosnia and Herzegovina | |
Bosnia and Herzegovina | |
Bulgaria | |
Bulgaria | |
Croatia | |
Croatia | |
Czech Republic | |
Czech Republic | |
Estonia | |
Estonia | |
France | |
France | |
Germany | |
Germany | |
Greece | |
Greece | |
Ireland | |
Italy | |
Italy | |
Luxembourg | |
Luxembourg | |
Montenegro | |
Netherlands | |
North Macedonia | |
North Macedonia | |
Norway | |
Poland | |
Poland | |
Portugal | |
Romania | |
Romania | |
Serbia | |
Serbia | |
Slovakia | |
Spain | |
Spain | |
Sweden | |
Switzerland | |
Türkiye | |
Türkiye | |
United Kingdom | |
United Kingdom |
Main Contacts
Action Contacts
COST Staff
Leadership
Role | Leader |
---|---|
Action Chair | |
Action Vice-Chair | |
Grant Holder Scientific Representative | |
Science Communication Coordinator | |
Grant Awarding Coordinator | |
WG1 Leader | |
WG2 Leader | |
WG3 Leader | |
WG4 Leader | |
WG5 Leader |
Additional roles
Role | Leader |
---|---|
WG1 CoLeader | |
WG2 CoLeader | |
WG3 CoLeader | |
WG4 coLeader | |
WG5 Leader | |
Gender Awareness Representative | |
Vice Science Communication Coordinator | |
Early Career Representative | |
Vice Grant Award Coordinator |
Working Groups
Number | Title | Leader |
---|---|---|
1 | Cartan Geometry and Representation theory | |
2 | Integrable Systems and Supersymmetry | |
3 | Noncommutative Geometry and Quantum Homogeneous Spaces | |
4 | Vision models | |
5 | Dissemination and Public Engagement |
Express your interest to join any of the working groups by applying below.
It is required to have an e-COST profile to submit your application. If needed, create it first and then click 'Apply'.
ApplyMembership
Name | Working Group | Country |
---|---|---|
WG 1, WG 2, WG 3 | Switzerland | |
WG 1 | Ireland | |
WG 1, WG 3 | Italy | |
WG 1, WG 2, WG 3 | Italy | |
WG 1, WG 3 | ||
WG 1, WG 3 | Croatia | |
WG 1 | Czechia | |
WG 1 | Poland | |
WG 1, WG 2, WG 3, WG 5 | Spain | |
WG 1, WG 2, WG 3 | Germany | |
WG 1, WG 2 | Italy | |
WG 1, WG 2, WG 3 | Czechia | |
WG 1, WG 2 | Norway | |
WG 1, WG 2, WG 3 | Czechia | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Italy | |
WG 1, WG 2 | Luxembourg | |
WG 1, WG 2 | Norway | |
WG 1, WG 2, WG 3 | Spain | |
WG 1, WG 2, WG 3 | Italy | |
WG 1 | Romania | |
WG 1, WG 3, WG 4 | Czechia | |
WG 1 | Germany | |
WG 1, WG 3 | Serbia | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Italy | |
WG 1, WG 3 | France | |
WG 1, WG 3 | Croatia | |
WG 1, WG 3 | Italy | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Italy | |
WG 1, WG 2, WG 3 | France | |
WG 1 | Italy | |
WG 1, WG 2 | Spain | |
WG 1 | Italy | |
WG 1, WG 3 | Austria | |
WG 1, WG 3, WG 5 | Croatia | |
WG 1, WG 3 | Italy | |
WG 1 | Italy | |
WG 1, WG 2 | France | |
WG 1 | Bulgaria | |
WG 1, WG 5 | Bosnia & Herzegovina | |
WG 1, WG 2, WG 3 | Italy | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Italy | |
WG 1 | Germany | |
WG 1, WG 2, WG 3 | France | |
WG 1, WG 3 | Argentina | |
WG 1, WG 2, WG 3 | Greece | |
WG 1, WG 5 | Germany | |
WG 1, WG 3 | France | |
WG 1, WG 2, WG 4, WG 5 | Serbia | |
WG 1, WG 2, WG 3 | Switzerland | |
WG 1, WG 2, WG 3 | France | |
WG 1 | Belgium | |
WG 1 | Italy | |
WG 1 | Estonia | |
WG 1, WG 2, WG 3 | Spain | |
WG 1, WG 2, WG 3 | Türkiye | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Belgium | |
WG 1 | Bosnia & Herzegovina | |
WG 1, WG 2 | ||
WG 1, WG 3 | Italy | |
WG 1 | United Kingdom | |
WG 1, WG 2 | Belgium | |
WG 1, WG 3 | Estonia | |
WG 1, WG 2 | ||
WG 1 | Croatia | |
WG 1, WG 3 | Croatia | |
WG 1, WG 2 | Belgium | |
WG 1, WG 5 | Bosnia & Herzegovina | |
WG 1, WG 2, WG 3 | Estonia | |
WG 1 | Belgium | |
WG 1, WG 2 | Germany | |
WG 1, WG 2, WG 4, WG 5 | Serbia | |
WG 1, WG 2 | Italy | |
WG 1 | Belgium | |
WG 1, WG 2, WG 3, WG 4 | Albania | |
WG 1, WG 3 | Austria | |
WG 1, WG 2, WG 3 | Italy | |
WG 1, WG 2, WG 3 | Germany | |
WG 1, WG 2 | Portugal | |
WG 1, WG 3 | Italy | |
WG 1, WG 2, WG 3 | Czechia | |
WG 1, WG 2, WG 4 | Denmark | |
WG 1, WG 2 | United Kingdom | |
WG 1, WG 3 | Norway | |
WG 1, WG 2 | Belgium | |
WG 1, WG 3 | Greece | |
WG 1, WG 2, WG 3 | United Kingdom | |
WG 1, WG 2, WG 3, WG 4 | Italy | |
WG 1 | France | |
WG 1, WG 2 | United States | |
WG 1, WG 2, WG 3 | Croatia | |
WG 1 | United States | |
WG 1, WG 2, WG 3 | Italy | |
WG 1, WG 3 | Poland | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Spain | |
WG 1, WG 3 | Italy | |
WG 1, WG 2, WG 3, WG 4 | Austria | |
WG 1 | Belgium | |
WG 1, WG 2, WG 3, WG 4, WG 5 | United Kingdom | |
WG 1, WG 2 | Italy | |
WG 1, WG 2, WG 3, WG 5 | Italy | |
WG 1 | Norway | |
WG 1, WG 4 | Portugal | |
WG 1, WG 2, WG 3 | Germany | |
WG 1 | Germany | |
WG 1, WG 2, WG 3, WG 5 | United Kingdom | |
WG 1, WG 3 | United Kingdom | |
WG 1 | Spain | |
WG 1, WG 2, WG 3 | Poland | |
WG 1, WG 3 | Poland | |
WG 1, WG 2 | Chile | |
WG 1, WG 2, WG 3 | Poland | |
WG 1 | Ireland | |
WG 1, WG 2, WG 3, WG 5 | Bulgaria | |
WG 1 | Netherlands | |
WG 1 | Switzerland | |
WG 1, WG 2, WG 3 | Bulgaria | |
WG 1 | Portugal | |
WG 1, WG 2, WG 3, WG 5 | United Kingdom | |
WG 1, WG 3 | Croatia | |
WG 1, WG 2 | Poland | |
WG 1, WG 2 | Poland | |
WG 1, WG 2 | Australia | |
WG 1, WG 3, WG 4 | Italy | |
WG 1, WG 3 | Montenegro | |
WG 1, WG 2 | Czechia | |
WG 1, WG 2, WG 3 | Poland | |
WG 1, WG 3 | Montenegro | |
WG 1 | Spain | |
WG 1, WG 3 | North Macedonia | |
WG 1, WG 3, WG 4 | Netherlands | |
WG 1, WG 3, WG 4 | Netherlands | |
WG 1 | France | |
WG 1, WG 2, WG 3 | Belgium | |
WG 1 | Türkiye | |
WG 1 | Sweden | |
WG 1, WG 2, WG 4 | Poland | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Türkiye | |
WG 1, WG 2 | France | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Italy | |
WG 1, WG 2, WG 3, WG 4, WG 5 | Netherlands | |