Geodesic
SPECTRAL CONDITIONS FOR UNIFORM P-ERGODICITIES OF MARKOV OPERATORS ON ABSTRACT STATES SPACES
Glasgow mathematical journal, Tome 63 (2021) no. 3, pp. 682-696

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In the present paper, we deal with asymptotical stability of Markov operators acting on abstract state spaces (i.e. an ordered Banach space, where the norm has an additivity property on the cone of positive elements). Basically, we are interested in the rate of convergence when a Markov operator T satisfies the uniform P-ergodicity, i.e. $\|T^n-P\|\to 0$, here P is a projection. We have showed that T is uniformly P-ergodic if and only if $\|T^n-P\|\leq C\beta^n$, $0<\beta<1$. In this paper, we prove that such a β is characterized by the spectral radius of T − P. Moreover, we give Deoblin’s kind of conditions for the uniform P-ergodicity of Markov operators. 
ERKURŞUN-ÖZCAN, NAZIFE; MUKHAMEDOV, FARRUKH. SPECTRAL CONDITIONS FOR UNIFORM P-ERGODICITIES OF MARKOV OPERATORS ON ABSTRACT STATES SPACES. Glasgow mathematical journal, Tome 63 (2021) no. 3, pp. 682-696. doi: 10.1017/S0017089520000440
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     title = {SPECTRAL {CONDITIONS} {FOR} {UNIFORM} {P-ERGODICITIES} {OF} {MARKOV} {OPERATORS} {ON} {ABSTRACT} {STATES} {SPACES}},
     journal = {Glasgow mathematical journal},
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     year = {2021},
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     doi = {10.1017/S0017089520000440},
     url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089520000440/}
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