Date
Thu, 09 Nov 2017
Time
16:00 - 17:30
Location
L4
Speaker
Laurence Carassus
Organisation
De Vinci Pôle Universitaire and Université de Reims

This paper formulates an utility indifference pricing model for investors trading in a discrete time financial market under non-dominated model uncertainty.
The investors preferences are described by strictly increasing concave random functions defined on the positive axis. We prove that under suitable
conditions the multiple-priors utility indifference prices of a contingent claim converge to its multiple-priors superreplication price. We also
revisit the notion of certainty equivalent for random utility functions and establish its relation with the absolute risk aversion.

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