Classifies smooth measure classes via denseness and locality, relates Kato class to finite-energy Radon measures, introduces Miyadera metric on Dynkin class, and proves continuity of Revuz correspondence.
Kallenberg, Foundations of Modern Probability , 2nd ed., Springer New York, NY
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Classification and Metrization of Classes of Smooth measures
Classifies smooth measure classes via denseness and locality, relates Kato class to finite-energy Radon measures, introduces Miyadera metric on Dynkin class, and proves continuity of Revuz correspondence.