On the extension property of dilatation monotone risk measures

Abstract

Let X be a subset of L1 that contains the space of simple random variables L and : X → (-∞,∞] a dilatation monotone functional with the Fatou property. In this note, we show that extends uniquely to a σ(L1,L) lower semicontinuous and dilatation monotone functional : L1 → (-∞,∞]. Moreover, preserves monotonicity, (quasi)convexity, and cash-additivity of . Our findings complement recent extension results for quasiconvex law-invariant functionals proved in [17,20]. As an application of our results, we show that transformed norm risk measures on Orlicz hearts admit a natural extension to L1 that retains the robust representations obtained in [4,6].