Add to ORKGIt is well known that the monotonicity condition, either in Lasry-Lions sense or in displacement sense, is crucial for the global well-posedness of mean field game master equations, as well as for the uniqueness of mean field equilibria and solutions to mean field game systems. In the literature, the monotonicity conditions are always taken in a fixed direction. In this paper we propose a new type of monotonicity condition in the opposite direction, which we call the anti-monotonicity condition, and establish the global well-posedness for mean field game master equations with nonseparable Hamiltonians. Our anti-monotonicity condition allows our data to violate both the Lasry-Lions monotonicity and the displacement monotonicity conditions.Co...
We present the notion of monotone solution of mean field games master equations in the case of a con...
In this paper we construct short time classical solutions to a class of master equations in the pres...
© 2018 Society for Industrial and Applied Mathematics. We address the numerical approximation of mea...
In this manuscript we derive a new nonlinear transport equation written on the space of probability ...
This manuscript constructs global in time solutions to master equations for potential mean field gam...
In this paper, we study mean field games with mean-field-dependent volatility, and associated fully ...
We present the notion of monotone solution of mean field games master equations in the case of a con...
The purpose of this work is to introduce a notion of weak solution to the master equation of a poten...
We consider mean field game systems in time-horizon (0, T), where the individual cost functional dep...
We consider mean field game systems in time-horizon (0, T), where the individual cost functional dep...
In this paper we study mean field game systems under density constraints as optimality conditions of...
This work establishes the equivalence between Mean Field Game and a class of PDE systems closely rel...
In this paper we obtain Sobolev estimates for weak solutions of first order variational Mean Field G...
We present the notion of monotone solution of mean field games master equations in the case of a con...
We present the notion of monotone solution of mean field games master equations in the case of a con...
We present the notion of monotone solution of mean field games master equations in the case of a con...
In this paper we construct short time classical solutions to a class of master equations in the pres...
© 2018 Society for Industrial and Applied Mathematics. We address the numerical approximation of mea...
In this manuscript we derive a new nonlinear transport equation written on the space of probability ...
This manuscript constructs global in time solutions to master equations for potential mean field gam...
In this paper, we study mean field games with mean-field-dependent volatility, and associated fully ...
We present the notion of monotone solution of mean field games master equations in the case of a con...
The purpose of this work is to introduce a notion of weak solution to the master equation of a poten...
We consider mean field game systems in time-horizon (0, T), where the individual cost functional dep...
We consider mean field game systems in time-horizon (0, T), where the individual cost functional dep...
In this paper we study mean field game systems under density constraints as optimality conditions of...
This work establishes the equivalence between Mean Field Game and a class of PDE systems closely rel...
In this paper we obtain Sobolev estimates for weak solutions of first order variational Mean Field G...
We present the notion of monotone solution of mean field games master equations in the case of a con...
We present the notion of monotone solution of mean field games master equations in the case of a con...
We present the notion of monotone solution of mean field games master equations in the case of a con...
In this paper we construct short time classical solutions to a class of master equations in the pres...
© 2018 Society for Industrial and Applied Mathematics. We address the numerical approximation of mea...