Abstract
In this paper, we study the basic properties of stationary transition probability of Markov processes on a general measurable space (E, ℰ), such as the continuity, maximum probability, zero point, positive probability set,standardization, and obtain a series of important results such as Continuity Theorem, Representation Theorem, Levy Theorem and so on. These results are very useful for us to study stationary tri-point transition probability on a general measurable space (E, ℰ). Our main tools such as Egoroff’s Theorem, Vitali-Hahn-Saks’s Theorem and the theory of atomic set and well-posedness of measure are also very interesting and fashionable.
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