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Principle Seminar of the Department of Probability Theory, Moscow State University
October 13, 2010 16:45, Moscow, MSU, auditorium 16-24
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Utility maximization: a dual problem and connections with upper prices of hedging contingent claims
A. A. Gushchinab a Steklov Mathematical Institute of Russian Academy of Sciences, Moscow
b Lomonosov Moscow State University
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Abstract:
In the first part of the talk we discuss the problem of maximizing robust utility from terminal wealth and its special cases. The main attention will be paid to a dual problem for a general static market model in the case where the utility function is finite on a half-line.
In the second part of the talk we discuss, in particular, for a general dynamic market model, necessary and sufficient conditions for a dual problem to be expressed in terms of supermartingale densities or measures. It turns out that this problem is closely related to the question whether the upper price of a contingent claim can be
expressed in the same terms.
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