Maximal coupling procedure and stability of discrete Markov chains. I MV Kartashov, VV Golomozy Theory of Probability and Mathematical Statistics 86, 81-91, 2012 | 27 | 2012 |
A subgeometric estimate for the stability of time-homogeneous Markov chains VV GOLOMOZIi Teor. Imovır. Mat. Stat 81, 31-45, 2009 | 19* | 2009 |
Maximal coupling procedure and stability of discrete Markov chains. II M Kartashov, V Golomozyĭ Theory of Probability and Mathematical Statistics 87, 65-78, 2013 | 15 | 2013 |
Stability of non-homogeneous Markov chains VV Golomozyı Visnyk Kyiv Univ., ser. fiz. mat. nauk 4, 10-15, 2009 | 15 | 2009 |
An inequality for the coupling moment in the case of two inhomogeneous Markov chains V Golomozyĭ Theory of Probability and Mathematical Statistics 90, 43-56, 2015 | 11 | 2015 |
The mean coupling time for independent discrete renewal processes MV Kartashov, VV Golomozy Theory of Probability and Mathematical Statistics 84, 77-83, 2011 | 11 | 2011 |
Impact of the stress factor on the price of widow’s pensions. proofs V Golomozyĭ, M Kartashov, Y Kartashov Theory of Probability and Mathematical Statistics 92, 17-22, 2016 | 10 | 2016 |
On the integrability of the coupling moment for time-inhomogeneous Markov chains V Golomoziy, N Kartashov Theory of Probability and Mathematical Statistics 89, 1-12, 2014 | 10 | 2014 |
Maximal coupling and 𝑉-stability of discrete nonhomogeneous Markov chains V Golomozyĭ, M Kartashov Theory of Probability and Mathematical Statistics 93, 19-31, 2016 | 9* | 2016 |
The impact of stress factors on the price of widow’s pensions Y Kartashov, V Golomoziy, N Kartashov Modern problems in insurance mathematics, 223-237, 2014 | 9 | 2014 |
Maximal coupling procedure and stability of discrete Markov chains. II MV Kartashov, VV Golomoziy THEORY OF PROBABILITY AND MATHEMATICAL STATISTICS 87, 58-70, 2012 | 9 | 2012 |
Stability estimates for finite-dimensional distributions of time-inhomogeneous Markov chains V Golomoziy, Y Mishura Mathematics 8 (2), 174, 2020 | 7 | 2020 |
An estimate of the expectation of the excess of a renewal sequence generated by a time-inhomogeneous markov chain if a square-integrable majorizing sequence exists V Golomozyĭ Theory of Probability and Mathematical Statistics 94, 53-62, 2017 | 7 | 2017 |
An estimate for an expectation of the simultaneous renewal for time-inhomogeneous Markov chains V Golomoziy Modern Stochastics: Theory and Applications 3 (4), 315-323, 2016 | 7 | 2016 |
Maximal coupling and V-stability of discrete nonhomogeneous markov chains MV Kartashov, VV Golomozyĭ Theory of Probability and Mathematical Statistics 93, 19-31, 2016 | 7 | 2016 |
On coupling moment integrability for time-inhomogeneous Markov chains VV Golomoziy, NV Kartashov Теорія ймовірностей та математична статистика, 1-11, 2013 | 7 | 2013 |
On estimation of expectation of simultaneous renewal time of time-inhomogeneous Markov chains using dominating sequence V Golomoziy Modern Stochastics: Theory and Applications 6 (3), 333-343, 2019 | 6 | 2019 |
An estimate for an expectation of the excess of the renewal sequence generated by the non-homogeneous Markov chain under a condition of existence square-integrable stochastic … V Golomoziy Theory Probab. Math. Stat 94, 50-59, 2016 | 5 | 2016 |
An estimate of the stability for nonhomogeneous Markov chains under classical minorization condition V Golomozyĭ Theory of Probability and Mathematical Statistics 88, 35-49, 2014 | 5 | 2014 |
The mean coupling time for independent discrete renewal processes M Kartashov, V Golomozyĭ Theory of Probability and Mathematical Statistics 84, 79-86, 2012 | 5 | 2012 |