A measure approximation theorem for Wasserstein-robust expected values
Abstract
We consider the problem of finding the infimum, over probability measures being in a ball defined by Wasserstein distance, of the expected value of a bounded Lipschitz random variable on Rd. We show that if the σ-algebra is approximated in by a sequence of σ-algebras in a certain natural sense, then the solutions of the induced approximated minimization problems converge to that of the initial minimization problem.
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