Quasi-compactness and uniform ergodicity of positive operators

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DOI10.1007/BF02762018zbMath0374.47015OpenAlexW1981399484MaRDI QIDQ1245425

Michael Lin

Publication date: 1978

Published in: Israel Journal of Mathematics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/bf02762018

Mathematics Subject Classification ID

Ergodic theory of linear operators (47A35) Riesz operators; eigenvalue distributions; approximation numbers, (s)-numbers, Kolmogorov numbers, entropy numbers, etc. of operators (47B06) Linear operators on ordered spaces (47B60)

Related Items (11)

Conditional law of large numbers and entropy of Markov processes ⋮ Uniform ergodic theorems for Markov operators on C(X) ⋮ Uniform ergodic theorems for Markov operators on C(X) ⋮ Quasi-compactness and Uniform Convergence of Markov Operator Nets on KB-spaces ⋮ On quasi-compact Markov nets ⋮ Quasi-compactness and mean ergodicity for Markov kernels acting on weighted supremum normed spaces ⋮ Spectral gaps for hyperbounded operators ⋮ VARIANCE BOUNDING MARKOV CHAINS, L₂-UNIFORM MEAN ERGODICITY AND THE CLT ⋮ Quasi-compactness of dominated positive operators and \(C_0\)-semigroups ⋮ Peripheral spectrum of positive quasi-compact operators on \(C_0(X)\) ⋮ Uniformly ergodic maps on \(C^*\)-algebras

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