On Quantile Risk Measures and Their Domain

Abstract

In the present paper we study quantile risk measures and their domain. Our starting point is that, for a probability measure Q on the open unit interval and a wide class LQ of random variables, we define the quantile risk measure Q as the map which integrates the quantile function of a random variable in LQ with respect to Q . The definition of LQ ensures that Q cannot attain the value +∞ and cannot be extended beyond LQ without losing this property. The notion of a quantile risk measure is a natural generalization of that of a spectral risk measure and provides another view at the distortion risk measures generated by a distribution function on the unit interval. In this general setting, we prove several results on quantile or spectral risk measures and their domain with special consideration of the expected shortfall.