2017
DOI: 10.1007/s11579-017-0206-z
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Mean field game of controls and an application to trade crowding

Abstract: In this paper we formulate the now classical problem of optimal liquidation (or optimal trading) inside a Mean Field Game (MFG). This is a noticeable change since usually mathematical frameworks focus on one large trader facing a "background noise" (or "mean field"). In standard frameworks, the interactions between the large trader and the price are a temporary and a permanent market impact terms, the latter influencing the public price.In this paper the trader faces the uncertainty of fair price changes too b… Show more

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Cited by 181 publications
(207 citation statements)
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“…Each solution A of this equation produces a solution for the system (7). Hence if φ and m 0 are such that the previous equation admits a unique solution then we have proved uniqueness.…”
Section: 3mentioning
confidence: 62%
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“…Each solution A of this equation produces a solution for the system (7). Hence if φ and m 0 are such that the previous equation admits a unique solution then we have proved uniqueness.…”
Section: 3mentioning
confidence: 62%
“…Thus terms of the form G(∇u(·), m(·)) = T d g(∇u(y))m(y)dy seem to be quite general for applications. See the example studied in [7] for example. Moreover such a term satisfies the assumption of theorem 1.…”
Section: 3mentioning
confidence: 99%
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“…In many applications, individuals may interact through their controls, instead of their states. One example is an application of trade crowding which was tackled with a mean field game approach in the paper of Cardaliaguet and Lehalle [7]. There is also a model for price impact in the book of Carmona and Delarue which we take as one of our example problems in Section 4.4.2.…”
Section: Mean Field Games Of Controlmentioning
confidence: 99%