We present an elementary yet general proof of duality for Wasserstein distributionally robust optimization. The duality holds for any arbitrary Kantorovich transport cost, measurable loss function, and nominal probability distribution, provided that an interchangeability principle holds, which is equivalent to certain measurability conditions. To illustrate the broader applicability of our approach, we provide a rigorous treatment of duality results in distributionally robust Markov decision processes and distributionally robust multistage stochastic programming. Furthermore, we extend the result to other problems including infinity-Wasserstein distributionally robust optimization, risk-averse optimization, and globalized distributionally robust counterpart.
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