Complete duality for quasiconvex dynamic risk measures on modules of the $L^{p}$-type


Abstract in English

In the conditional setting we provide a complete duality between quasiconvex risk measures defined on $L^{0}$ modules of the $L^{p}$ type and the appropriate class of dual functions. This is based on a general result which extends the usual Penot-Volle representation for quasiconvex real valued maps.

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