In a dynamic framework, we study the conditional version of the classical notion of certainty equivalent when the preferences are described by a stochastic dynamic utility u(x, t, ω). We introduce an appropriate mathematical setting, namely Orlicz spaces determined by the underlying preferences and thus provide a systematic method to go beyond the case of bounded random variables. Finally we prove a conditional version of the dual representation which is a crucial prerequisite for discussing the dynamics of certainty equivalents.
Conditional certainty equivalent / M. Frittelli, M. Maggis - In: Finance at fields / [a cura di] M.R. Grasselli, L.P. Hughston. - [s.l] : World Scientific Publishing Co., 2012. - ISBN 9789814407892. - pp. 307-325 [10.1142/9789814407892_0013]
Conditional certainty equivalent
M. FrittelliPrimo
;M. MaggisUltimo
2012
Abstract
In a dynamic framework, we study the conditional version of the classical notion of certainty equivalent when the preferences are described by a stochastic dynamic utility u(x, t, ω). We introduce an appropriate mathematical setting, namely Orlicz spaces determined by the underlying preferences and thus provide a systematic method to go beyond the case of bounded random variables. Finally we prove a conditional version of the dual representation which is a crucial prerequisite for discussing the dynamics of certainty equivalents.
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