Titles and slides of talks

Y. Achdou (Université Paris Diderot)
Some applications of mean field games.
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)
Mean Field Games and Mean Field Type Control.
P. Caines (McGill University, Montreal)
MFG Theory for Nonlinear Systems with Major and Minor Agents.
F. Camilli (Sapienza Università di Roma)
A class of Mean Field Games systems defined on a network.
P. Cardaliaguet (Université Paris-Dauphine)
On first order mean field game systems.
G. Carlier (Université Paris-Dauphine)
Cournot Nash equilibria and optimal transport.
E. Carlini (Sapienza Università di Roma)
Semi-Lagrangian schemes for Mean Field Games models.
M. Cirant (Università di Padova)
Multi-population Ergodic Mean-Field Games with Neumann boundary conditions and a model of
segregation.
F. Delarue (Université de Nice Sophia-Antipolis)
Probabilistic approach for mean field games with a common noise.
M. Fornasier (Technische Universität München)
Mean-Field Optimal Control.
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)
On the 1/N convergence rates for mean-field approximations.
J.-M. Lasry (Université Paris-Dauphine)
Time to build : a MFG monotone system approach.
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)
Approximate Solutions for Deterministic Mean Field Games.
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)
LQG Mean Field Games with ergodic cost in R^d.
H. Tembine (Ecole Supérieure d’Électricité SUPELEC, Paris)
Non-asymptotic mean field games.
W. Yang (University of Strathclyde, Glasgow)
Sensitivity analysis for HJB equations with an application to a system of coupled forwardbackward
equations.

Mean Field Games and Related Topics - 2

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Titles and slides of talks