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UID:20260623T235947EDT-2110vuldwI@132.216.98.100
DTSTAMP:20260624T035947Z
DESCRIPTION:Virtual Informal Systems Seminar (VISS) Centre for Intelligent 
 Machines (CIM) and Groupe d'Etudes et de Recherche en Analyse des Decision
 s (GERAD)\n\nYurii Averboukh\n\nAbstract:\n	The mean field game system is a
  system of Bellman and Kolmogorov equations. For the finite state case the
 y are ordinary differential equations. We examine the finite state mean fi
 led game assuming only continuity of the Kolmogorov matrix and award funct
 ions. Thus\, it may turns out that the optimal feedback depends on the sol
 ution of Bellman equation discontinuously. We show that under these\, rath
 er general\, assumptions the finite state mean field game can be regarded 
 as a control problem with boundary constraints. Based on this\, we describ
 e the set of solutions of the mean field game for the given initial distri
 bution of players as a viable set under certain dynamical system.\n	\n	Bio: 
 ‪\n	Yurii Averboukh is a research staff member at Krasovskii Institute of M
 athematics and Mechanics (Yekaterinburg\, Russia) and a researcher in the 
 Labarotory of stochastic analysis at Higher School of Economics (Moscow). 
  He obtained the PhD degree from Institute of mathematics and mechanics of
  Ural Branch of Russian Academy of Sciences in 2007.   Yurii's interests l
 ies in the field of optimal control theory and are focused on differential
  games\, mean field games and the theory of mean field type control proble
 ms.\n	 \n
DTSTART:20201009T150000Z
DTEND:20201009T160000Z
LOCATION:CA\, ZOOM
SUMMARY:Control Theory Viewpoint to the Finite State Mean Field Games
URL:/cim/channels/event/control-theory-viewpoint-finit
 e-state-mean-field-games-325246
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