On the surjectivity of the conditional expectation given a real random variable

Abstract

In this paper, we investigate the distributions of random couples (X,Y) with X real-valued such that any non-negative integrable random variable f(X) can be represented as a conditional expectation, f(X)=E[g(Y)|X], for some non-negative measurable function g. It turns out that this representation property is related to the smallness of the support of the conditional law of X given Y, and in particular fails when this conditional law almost surely has a non-zero absolutely continuous component with respect to the Lebesgue measure. We give a sufficient condition for the representation property and check that it is also necessary under some additional assumptions (for instance when X or Y are discrete). We also exhibit a rather involved example where the representation property holds but the sufficient condition does not. Finally, we discuss a weakened representation property where the non-negativity of g is relaxed. This study is motivated by the calibration of time-discretized path-dependent volatility models to the implied volatility surface.