Atlas: Existence of equilibria in certain games: topological and geometric aspects. by Henryk Torunczyk

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Geometric Topology II
September 29 - October 5, 2002
Inter-University Center, Dubrovnik; Department of Mathematics, University of Zagreb
Dubrovnik, Croatia

Organizers
Ivan Ivansic, University of Zagreb;, James E. Keesling, University of Florida;, Alexander N. Dranishnikov, University of Florida;, Sime Ungar, University of Zagreb

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Existence of equilibria in certain games: topological and geometric aspects.
by
Henryk Torunczyk
Warsaw University
Coauthors: R.S. Simon (Goettingen), S. Spiez (Warszawa)

The motivation for our research comes from considering the problem of the existence of equilibria in a class of games. (These are two-person, infinitely repeated games with incomplete information on one side.) This problem may be translated into a geometric language and solved using topological methods. I intend to describe the geometrical and topological results obtained, which deal with separation of members of a family of convex functions and with an analogue, for set-valued functions, of a weak form of Borsuk-Ulam theorem. As compared with a talk at an earlier Dubrovnik conference the progress has its source in establishing connection between the homological property needed and the fact that a set-valued function associated with the game disconnects the target cube between a vertex and the union of faces disjoint from it. This allows to broaden essentially the class of the games considered.

Date received: August 30, 2002