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We consider conditional convex risk measures on L^p and show their robust representation in a standard way. Such measures are used as evaluation functionals for optimal portfolio selection in a Black&Scholes setting. We study this problem focusing on the conditional Average Value at Risk and the conditional entropic risk measure, and compare the respective optimizers.

Optimal portfolio selection via conditional convex risk measures on L^p

ACCIAIO, BEATRICE;
2011

Abstract

We consider conditional convex risk measures on L^p and show their robust representation in a standard way. Such measures are used as evaluation functionals for optimal portfolio selection in a Black&Scholes setting. We study this problem focusing on the conditional Average Value at Risk and the conditional entropic risk measure, and compare the respective optimizers.
2011
DECISIONS IN ECONOMICS AND FINANCE
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11391/1025466
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