Fédération de Recherche Mathématiques des Pays de Loire

FR CNRS 2962

Paulwin GRAEWE

Date début de l'évènement
Date de fin l'évènement

Since several years, Paulwin and I worked and published some articles on similar topics. Last year I was invited in Berlin to gather these competencies. Since then, Paulwin and I, together with Ulrich Horst and Guanxing Fu, we are working on the mean field game of optimal portfolio liquidation. Besides the financial application, this mean-field optimal control problem is related to a mean-field forward backward stochastic differential equation with a terminal singularity. We have obtained a first result on this topic which has been submitted very recently: solvability of the FBSDE in a new weighted integrability space, using a partial decoupling field and approximation of the Nash equilibrium. Nevertheless our requirement on the parameters of the model is quite strong, compared to the single player case. We have already raised this point during our discussions and one aim of this invitation is to enlarge the parameters setting. Until now we worked in the Brownian filtration. The second point involves working in a general filtration, for example to take into account the noise induced by the use of a dark pool for liquidation. There are also several points concerning the theory of singular BSDE we want to discuss : - asymptotic approach of GHS - existence by considering the reciprocal - existence by Perron's method / cp - uniqueness under L^\infty assumptions. This invitation is a great opportunity to develop these subjects together.