Value-at-Risk bounds for aggregated risks have been derived in the literature in settings where besides the marginal distributions of the individual risk factors one-sided bounds for the joint distribution respectively the copula of the risks are available. In applications it turns out that...

The Wasserstein barycenter is an important notion in the analysis of high dimensional data with a broad range of applications in applied probability, economics, statistics, and in particular to clustering and image processing. We state a general version of the equivalence of the Wasserstein...

Based on a novel extension of classical Hoeffding-Fréchet bounds, we provide an upper VaR bound for joint risk portfolios with fixed marginal distributions and positive dependence information. The positive dependence information can be assumed to hold in the tails, in some central part, or on a...