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[1] V. V. Golomozyĭ.
An estimate of the expectation of the excess of a renewal sequence generated by a timeinhomogeneous Markov chain if a squareintegrable majorizing sequence exists.
Theor. Probability and Math. Statist.
94
(2017)
5362.
Abstract, references, and article information View Article: PDF [2] V. V. Golomozyĭ and M. V. Kartashov. Maximal coupling and $V$stability of discrete nonhomogeneous Markov chains. Theor. Probability and Math. Statist. 93 (2016) 1931. Abstract, references, and article information View Article: PDF [3] M. V. Kartashov. The asymptotic behavior of the distribution of Markov moments in timeinhomogeneous Markov chains and its application to a discrete Cram\'erLundberg model. Theor. Probability and Math. Statist. 92 (2016) 3758. Abstract, references, and article information View Article: PDF [4] V. V. Golomozyĭ, M. V. Kartashov and Yu. M. Kartashov. Impact of the stress factor on the price of widow's pensions. Proofs. Theor. Probability and Math. Statist. 92 (2016) 1722. Abstract, references, and article information View Article: PDF [5] V. V. Golomozyĭ and M. V. Kartashov. Maximal coupling and stability of discrete nonhomogeneous Markov chains. Theor. Probability and Math. Statist. 91 (2015) 1727. Abstract, references, and article information View Article: PDF [6] V. V. Golomozyĭ. An inequality for the coupling moment in the case of two inhomogeneous Markov chains. Theor. Probability and Math. Statist. 90 (2015) 4356. Abstract, references, and article information View Article: PDF [7] V. S. Koroliuk, R. Manca and G. D’Amico. Storage impulsive processes on increasing time intervals. Theor. Probability and Math. Statist. 89 (2014) 7181. Abstract, references, and article information View Article: PDF [8] V. V. Golomoziy and N. V. Kartashov. On the integrability of the coupling moment for timeinhomogeneous Markov chains. Theor. Probability and Math. Statist. 89 (2014) 112. Abstract, references, and article information View Article: PDF [9] N. V. Kartashov. Quantitative and qualitative limits for exponential asymptotics of hitting times for birthanddeath chains in a scheme of series. Theor. Probability and Math. Statist. 89 (2014) 4556. Abstract, references, and article information View Article: PDF [10] V. V. Golomozyĭ. An estimate of the stability for nonhomogeneous Markov chains under classical minorization condition. Theor. Probability and Math. Statist. 88 (2014) 3549. Abstract, references, and article information View Article: PDF [11] M. V. Kartashov. The asymptotic behavior of rare Markov moments defined on time inhomogeneous Markov chains. Theor. Probability and Math. Statist. 88 (2014) 109121. Abstract, references, and article information View Article: PDF [12] M. V. Kartashov and V. V. Golomozyĭ. Maximal coupling procedure and stability of discrete Markov chains. II. Theor. Probability and Math. Statist. 87 (2013) 6578. Abstract, references, and article information View Article: PDF [13] M. V. Kartashov and V. V. Golomozyĭ. Maximal coupling procedure and stability of discrete Markov chains. I. Theor. Probability and Math. Statist. 86 (2013) 93104. Abstract, references, and article information View Article: PDF [14] M. V. Kartashov and V. V. Golomozyĭ. The mean coupling time for independent discrete renewal processes. Theor. Probability and Math. Statist. 84 (2012) 7986. Abstract, references, and article information View Article: PDF This article is available free of charge [15] 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) 6578. Abstract, references, and article information View Article: PDF This article is available free of charge [16] Yu. M. Kartashov. Limit theorems for difference additive functionals. Theor. Probability and Math. Statist. 83 (2011) 8394. MR 2768850. Abstract, references, and article information View Article: PDF This article is available free of charge [17] 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) 2741. MR 2790481. Abstract, references, and article information View Article: PDF This article is available free of charge [18] 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) 7183. MR 2667311. Abstract, references, and article information View Article: PDF This article is available free of charge [19] Aleksey M. Kulik. Difference approximation of the local times of multidimensional diffusions. Theor. Probability and Math. Statist. 78 (2009) 97114. MR 2446852. Abstract, references, and article information View Article: PDF This article is available free of charge [20] M. V. Kartashov. Inhomogeneous perturbations of a renewal equation and the CramérLundberg theorem for a risk process with variable premium rates. Theor. Probability and Math. Statist. 78 (2009) 6173. MR 2446849. Abstract, references, and article information View Article: PDF This article is available free of charge [21] Yu. M. Kartashov. Sufficient conditions for the convergence of localtime type functionals of Markov approximations. Theor. Probability and Math. Statist. 77 (2008) 3955. MR 2432771. Abstract, references, and article information View Article: PDF This article is available free of charge [22] M. V. Kartashov. The stability of transient quasihomogeneous Markov semigroups and an estimate of the ruin probability. Theor. Probability and Math. Statist. 75 (2007) 4150. MR 2321179. Abstract, references, and article information View Article: PDF This article is available free of charge [23] 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) 2339. MR 2321178. Abstract, references, and article information View Article: PDF This article is available free of charge [24] 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) 922. MR 2321177. Abstract, references, and article information View Article: PDF This article is available free of charge [25] 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) 7179. MR 2213842. Abstract, references, and article information View Article: PDF This article is available free of charge [26] M. V. Kartashov. The ergodicity and stability of quasihomogeneous Markov semigroups of operators. Theor. Probability and Math. Statist. 72 (2006) 5968. MR 2168136. Abstract, references, and article information View Article: PDF This article is available free of charge [27] M. V. Kartashov. The stability of almost homogeneous in time Markov semigroups of operators. Theor. Probability and Math. Statist. 71 (2005) 119128. MR 2144325. Abstract, references, and article information View Article: PDF This article is available free of charge 
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