Control of McKean-Vlasov Dynamics (Mean Field Control) and the Price of Anarchy
Host
Department of Applied MathematicsSpeaker
René CarmonaDepartment of Operations Research and Financial Engineering, Princeton University
https://www.princeton.edu/~rcarmona/
Description
We posit a new form of the optimal control of stochastic differential equations of McKean-Vlasov type (often called Mean Field Control), and we derive the corresponding Pontryagin maximum principle. This requires calculus over the Wasserstein space of probability measures. We contrast the resulting optima with the Nash equilibria of the associated Mean Field Games (MFGs), and we investigate the price of anarchy by comparing the results of centralized optimization to those of decentralized optimization of MFGs.