Absolute Continuity of Monotone Aggregations under Positive Regression Dependence

Abstract

In this paper, we provide a sufficient condition for the absolute continuity of one-dimensional push-forwards of dependent random vectors. Suppose that X has an absolutely continuous distribution and that the conditional distribution of an Rd-valued random vector Y given X=x is nondecreasing in x∈ R in the usual stochastic order. For Borel maps g R×Rd satisfying a coordinatewise monotonicity condition in Y and a uniform lower-increment condition in X, we prove that g(X,Y) has an absolutely continuous distribution. The result requires neither independence nor a joint density, and allows the marginal law of Y to be completely arbitrary. Moreover, the result remains valid if Rd is replaced by an arbitrary measurable space endowed with a reflexive binary relation. We discuss consequences for monotone risk aggregation and extensions of the familiar regularization by convolution beyond independent random variables.