 General Markov Chains: Dimension of the Space of Invariant Finitely Additive Measures and Their Ergodicity—Problematic ExamplesAlexander Zhdanok ()
Mathematics, 2025, vol. 13, issue 22, 1-22 Abstract: This study considers general Markov chains (MCs) with discrete time in an arbitrary phase space. The transition function of the MC generates two operators: T , which acts on the space of measurable functions, and A , which acts on the space of bounded countably additive measures. The operator T * , which is adjoint to T and acts on the space of finitely additive measures, is also constructed. A number of theorems are proved for the operator T * , including the ergodic theorem. Under certain conditions it is proved that if the MC has a finite number of basic invariant finitely additive measures then all of them are countably additive and the MC is quasi-compact. We demonstrate a methodology that applies finitely additive measures for the analysis of MCs, using examples with detailed proofs of their non-simple properties. Some of these proofs in the examples are more complicated than the proofs in our theorems. Keywords: general markov chains; markov operators; finitely additive measures; invariant measures; quasi-compactness; ergodic theorem (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:gam:jmathe:v:13:y:2025:i:22:p:3690-:d:1796595 Access Statistics for this article Mathematics is currently edited by Ms. Emma He More articles in Mathematics from MDPI |
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