Titles and slides of talks
- Y. Achdou (Université Paris Diderot)
- F. Bagagiolo (Università di Trento)
Mean-field games and dynamic demand management in power grids.
- D. Bauso (Università di Palermo)
Robust linear quadratic mean-field games in crowd-seeking social networks.
- N. Bellomo (Politecnico di Torino)
Evolutive Games Towards Modeling Complexity and Social Behaviors Looking for the Black Swan.
- A. Bensoussan (The University of Texas and City University of Hong Kong)
- P. Caines (McGill University, Montreal)
MFG Theory for Nonlinear Systems with Major and Minor Agents.
- F. Camilli (Sapienza Università di Roma)
- P. Cardaliaguet (Université Paris-Dauphine)
- G. Carlier (Université Paris-Dauphine)
- E. Carlini (Sapienza Università di Roma)
- M. Cirant (Università di Padova)
- F. Delarue (Université de Nice Sophia-Antipolis)
Probabilistic approach for mean field games with a common noise.
- M. Fornasier (Technische Universität München)
- D. Gomes (Universidade Técnica de Lisboa and K.A.U.S.T. Saudi Arabia)
Regularity for mean-field games in the superquadratic case.
Abstract: We consider time-dependent mean-field games with power-like local
dependence on the measure. We will prove the existence of classical
solutions for mean-field games for a class of superquadratic Hamiltonians
under appropriate growth conditions on the measure. Our proof will be based
upon a combination of the nonlinear adjoint method developed by L. C.
Evans, together with a number of estimates for the Fokker-Planck equation.
This is a joint work with E. Pimentel and H. S. Morgado. - M. Huang (Carleton University, Ottawa)
Mean field consumption-accumulation optimization with HARA utility.
- V. Kolokoltsov (University of Warwick)
- J.-M. Lasry (Université Paris-Dauphine)
- P.-L. Lions (Collége de France and Université Paris-Dauphine)
Some new results on Mean Field Games.
- R. Malhamé (Gerad and École Polytechnique de Montréal)
Mean field control as a mechanism design tool for a class of smart grid oriented applications.
- A. R. Mészáros (Université Paris-Sud)
A second order model for macroscopic crowd movements with congestion.
- T. Mylvaganam (Imperial College, London)
- E. Pimentel (Instituto Superior Técnico de Lisboa)
Regularity for the mean field games in the subquadratic case.
- F. S. Priuli (Università di Roma Tor Vergata)
- H. Tembine (Ecole Supérieure d’Électricité SUPELEC, Paris)
- W. Yang (University of Strathclyde, Glasgow)