The Wasserstein Distances Between Pushed-Forward Measures with Applications to Uncertainty Quantification

Abstract

In the study of dynamical and physical systems, the input parameters are often uncertain or randomly distributed according to a measure . The system's response f pushes forward to a new measure f which we would like to study. However, we might not have access to f but only to its approximation g. We thus arrive at a fundamental question -- if f and g are close in Lq, does g approximate f well, and in what sense? Previously, we demonstrated that the answer to this question might be negative in terms of the Lp distance between probability density functions (PDF). Here we show that the Wasserstein metric is the proper framework for this question. For any p≥ 1, we bound the Wasserstein distance Wp (f , g ) from above by \|f-g\|q. Furthermore, we provide lower bounds for the cases of p=1,2. Finally, we apply our theory to the analysis of common numerical methods in the field of computational uncertainty quantification.