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Results: 1 to 23 of 23 found      Go to page: 1

[1] V. V. Golomozyĭ and M. V. Kartashov. Maximal coupling and stability of discrete non-homogeneous Markov chains. Theor. Probability and Math. Statist. 91 (2015) 17-27.
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[2] V. V. Golomozyĭ. An inequality for the coupling moment in the case of two inhomogeneous Markov chains. Theor. Probability and Math. Statist. 90 (2015) 43-56.
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[3] V. S. Koroliuk, R. Manca and G. D’Amico. Storage impulsive processes on increasing time intervals. Theor. Probability and Math. Statist. 89 (2014) 71-81.
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[4] V. V. Golomoziy and N. V. Kartashov. On the integrability of the coupling moment for time-inhomogeneous Markov chains. Theor. Probability and Math. Statist. 89 (2014) 1-12.
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[5] N. V. Kartashov. Quantitative and qualitative limits for exponential asymptotics of hitting times for birth-and-death chains in a scheme of series. Theor. Probability and Math. Statist. 89 (2014) 45-56.
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[6] V. V. Golomozyĭ. An estimate of the stability for nonhomogeneous Markov chains under classical minorization condition. Theor. Probability and Math. Statist. 88 (2014) 35-49.
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[7] M. V. Kartashov. The asymptotic behavior of rare Markov moments defined on time inhomogeneous Markov chains. Theor. Probability and Math. Statist. 88 (2014) 109-121.
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[8] M. V. Kartashov and V. V. Golomozyĭ. Maximal coupling procedure and stability of discrete Markov chains. II. Theor. Probability and Math. Statist. 87 (2013) 65-78.
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[9] M. V. Kartashov and V. V. Golomozyĭ. Maximal coupling procedure and stability of discrete Markov chains. I. Theor. Probability and Math. Statist. 86 (2013) 93-104.
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[10] M. V. Kartashov and V. V. Golomozyĭ. The mean coupling time for independent discrete renewal processes. Theor. Probability and Math. Statist. 84 (2012) 79-86.
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[11] M. V. Kartashov. Improvement of the stability of solutions of an inhomogeneous perturbed renewal equation on the semiaxis. Theor. Probability and Math. Statist. 84 (2012) 65-78.
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[12] Yu. M. Kartashov. Limit theorems for difference additive functionals. Theor. Probability and Math. Statist. 83 (2011) 83-94. MR 2768850.
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[13] M. V. Kartashov. A minimal uniform renewal theorem and transition phenomena for a nonhomogeneous perturbation of the renewal equation. Theor. Probability and Math. Statist. 82 (2011) 27-41. MR 2790481.
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[14] M. V. Kartashov. Boundedness, limits, and stability of solutions of a perturbation of a nonhomogeneous renewal equation on a semiaxis. Theor. Probability and Math. Statist. 81 (2010) 71-83. MR 2667311.
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[15] Aleksey M. Kulik. Difference approximation of the local times of multidimensional diffusions. Theor. Probability and Math. Statist. 78 (2009) 97-114. MR 2446852.
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[16] M. V. Kartashov. Inhomogeneous perturbations of a renewal equation and the Cramér-Lundberg theorem for a risk process with variable premium rates. Theor. Probability and Math. Statist. 78 (2009) 61-73. MR 2446849.
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[17] Yu. M. Kartashov. Sufficient conditions for the convergence of local-time type functionals of Markov approximations. Theor. Probability and Math. Statist. 77 (2008) 39-55. MR 2432771.
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[18] M. V. Kartashov. The stability of transient quasi-homogeneous Markov semigroups and an estimate of the ruin probability. Theor. Probability and Math. Statist. 75 (2007) 41-50. MR 2321179.
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[19] T. Kadankova. Exit, passage, and crossing times and overshoots for a Poisson compound process with an exponential component. Theor. Probability and Math. Statist. 75 (2007) 23-39. MR 2321178.
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[20] I. I. Ezhov and V. F. Kadankov. Boundary functionals for the superposition of a random walk and a sequence of independent random variables. Theor. Probability and Math. Statist. 75 (2007) 9-22. MR 2321177.
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[21] M. V. Kartashov and O. M. Stroev. Lundberg approximation for the risk function in an almost homogeneous environment. Theor. Probability and Math. Statist. 73 (2006) 71-79. MR 2213842.
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[22] M. V. Kartashov. The ergodicity and stability of quasi-homogeneous Markov semigroups of operators. Theor. Probability and Math. Statist. 72 (2006) 59-68. MR 2168136.
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[23] M. V. Kartashov. The stability of almost homogeneous in time Markov semigroups of operators. Theor. Probability and Math. Statist. 71 (2005) 119-128. MR 2144325.
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Results: 1 to 23 of 23 found      Go to page: 1


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