Mean Field Games (MFG) theory is a recent branch of Dynamic Games aiming at modelling and solving complex decision processes involving a large number of agents which are each other influencing. The MFG framework has been recently applied to the known optimal trading problem. In the original model (see Cardaliaguet and Lehalle [1]), the Authors consider an optimal trading model where a continuum of homogeneous investors make trades on one single financial instrument. Each participant acts strategically controlling her trading speed given the information she has concerning the behaviour of the others in order to fulfil her goal. This leads to a MFG equilibrium in which the mean field depends on the agents’ actions. In this paper, we present a...
This paper goes beyond the optimal trading Mean Field Game model introduced by Pierre Cardaliaguet a...
In dynamical systems with a large number of agents, competitive, and cooperative phenomenaoccur in a...
International audienceWe study the liquidity, de ned as the size of the trading volume, in a situati...
Mean Field Games (MFG) theory is a recent branch of Dynamic Games aiming at modelling and solving co...
3noMean Field Games (MFG) theory is a recent branch of Dynamic Games aiming at modelling and solving...
International audienceIn this paper we formulate the now classical problem of optimal liquidation (o...
We present a trading execution model that describes the behaviour of a big trader and of a multitude...
This thesis explores how agents should optimally trade in electronic markets when they account for l...
Cardaliaguet and Lehalle (in their paper "Mean Field Game of Controls and An Application To Trade Cr...
Mean Field Game (MFG) systems describe equilibrium configurations in differential games with infinit...
This thesis focuses on incorporating the idea of ambiguity aversion into mean-field games. Intuitive...
This paper studies a mean field game (MFG) in a market with a large population of agents. Each agent...
Mean Field Games (MFG) are the infinite-population analogue of symmetric stochastic differential gam...
We design a market-making model \`a la Avellaneda-Stoikov in which the market-takers act strategical...
This paper goes beyond the optimal trading Mean Field Game model introduced by Pierre Cardaliaguet a...
In dynamical systems with a large number of agents, competitive, and cooperative phenomenaoccur in a...
International audienceWe study the liquidity, de ned as the size of the trading volume, in a situati...
Mean Field Games (MFG) theory is a recent branch of Dynamic Games aiming at modelling and solving co...
3noMean Field Games (MFG) theory is a recent branch of Dynamic Games aiming at modelling and solving...
International audienceIn this paper we formulate the now classical problem of optimal liquidation (o...
We present a trading execution model that describes the behaviour of a big trader and of a multitude...
This thesis explores how agents should optimally trade in electronic markets when they account for l...
Cardaliaguet and Lehalle (in their paper "Mean Field Game of Controls and An Application To Trade Cr...
Mean Field Game (MFG) systems describe equilibrium configurations in differential games with infinit...
This thesis focuses on incorporating the idea of ambiguity aversion into mean-field games. Intuitive...
This paper studies a mean field game (MFG) in a market with a large population of agents. Each agent...
Mean Field Games (MFG) are the infinite-population analogue of symmetric stochastic differential gam...
We design a market-making model \`a la Avellaneda-Stoikov in which the market-takers act strategical...
This paper goes beyond the optimal trading Mean Field Game model introduced by Pierre Cardaliaguet a...
In dynamical systems with a large number of agents, competitive, and cooperative phenomenaoccur in a...
International audienceWe study the liquidity, de ned as the size of the trading volume, in a situati...