On ws-convergence of product measures

A number of fundamental results, centered around extensions of Prohorov's theorem, is proven for the ws-topology for measures on a product space. These results contribute to die foundations of stochastic decision theory. They also subsume the principal results of Young measure theory, which only considers product measures with a fixed, common marginal. Specializations yield the criterion for relative ws-compactness of Schal (1975), the refined characterizations of ws-convergence of Galdeano and Truffert (1997, 1998), and a new version of Fatou's lemma in several dimensions. In a separate, nonsequential development, a generalization is given of the relative ws-compactness criterion of Jacod and Memin (1981). New applications are given to the existence of optimal equilibrium distributions over player-action pairs in game theory and the existence of most optimistic scenarios in stochastic decision theory.