Zobrazeno 1 - 10
of 96
pro vyhledávání: '"V. S. Korolyuk"'
Autor:
V. Ya. Hutlyans’kyi, V. O. Marchenko, Igor Parasyuk, I. O. Lukovs’kyi, V. S. Korolyuk, Leonid Pastur, R. M. Kushnir, Yu. M. Berezans’kyi, Viktor Tkachenko, O. A. Boichuk, M. I. Portenko, Anatoly N. Kochubei, O. M. Sharkovs’kyi, Miklós Rontó, M. O. Perestyuk, E. Ya. Khruslov, O. V. Antonyuk, A. H. Nikitin, Volodymyr L. Makarov, Sergei Trofimchuk
Publikováno v:
Ukrainian Mathematical Journal. 70:1-4
Autor:
Yu. M. Berezans’kyi, A. H. Nikitin, O. M. Sharkovs’kyi, I. O. Lukovs’kyi, I. О. Parasyuk, Volodymyr L. Makarov, M. O. Perestyuk, O. A. Boichuk, A. M. Samoilenko, V. S. Korolyuk
Publikováno v:
Ukrainian Mathematical Journal. 69:161-172
Autor:
Yu. A. Drozd, V. V. Sharko, Volodymyr L. Makarov, Yu. Yu. Trokhymchuk, I. O. Lukovs’kyi, O. A. Boichuk, A. H. Nikitin, Yu. M. Berezans’kyi, O. M. Sharkovs’kyi, V. S. Korolyuk, M. L. Horbachuk, M. O. Perestyuk, Yu. S. Samoilenko, M. I. Portenko
Publikováno v:
Ukrainian Mathematical Journal. 65:1-4
Autor:
V. S. Korolyuk
Publikováno v:
Ukrainian Mathematical Journal. 62:739-747
The problem of large deviations for random evolutions with independent increments is solved in the scheme of asymptotically small diffusion by passing to the limit in the nonlinear (exponential) generator of semigroups by using the solution of the pr
Autor:
Yu. S. Samoilenko, András Rontó, O. M. Sharkovs’kyi, A. A. Dorogovtsev, Yu. M. Berezans’kyi, O. L. Rebenko, M. O. Perestyuk, I. O. Lukovs’kyi, Ya. A. Mitropol’skii, M. I. Ronto, Yu. A. Drozd, Vladimir Makarov, M. L. Horbachuk, V. V. Sharko, V. S. Korolyuk
Publikováno v:
Ukrainian Mathematical Journal. 60:1-5
Publikováno v:
Cybernetics and Systems Analysis. 44:56-67
The paper justifies the second Lyapunov method for diffusion stochastic functional differential equations with Markov parameters, which generalize stochastic diffusion equations without aftereffect. Analogs of Lyapunov stability theorems, which gener
Publikováno v:
Cybernetics and Systems Analysis. 43:876-885
Lyapunov-Krasovskii functionals and infinitesimal operators are employed to analyze a system for asymptotic stochastic stability on the whole and asymptotic stability on the whole.
Autor:
Yu. M. Berezans’kyi, Yu. I. Samoilenko, M. L. Horbachuk, V. S. Korolyuk, M. O. Perestyuk, O. O. Stepanets, I. O. Lukovs’kyi, O. M. Sharkovs’kyi, A. M. Samoilenko, V. V. Sharko, V. M. Koshlyakov, Yu. Yu. Trokhymchuk, P. M. Tamrazov, Volodymyr L. Makarov
Publikováno v:
Ukrainian Mathematical Journal. 59:153-157
Autor:
A. N. Sharkovskii, Evgenii Frolovich Mishchenko, S. I. Pokhozhaev, I. V. Gaishun, N. A. Izobov, N. Kh. Rozov, V. S. Korolyuk, V. M. Millionshchikov, V. N. Koshlyakov, A. B. Vasil’eva, Vladimir Aleksandrovich Il'in, Anatolii M. Samoilenko, I. A. Lukovskii
Publikováno v:
Differential Equations. 43:1-9
Autor:
V. S. Korolyuk, N. Limnios
Publikováno v:
Ukrainian Mathematical Journal. 57:1466-1476
We consider an evolutionary system switched by a semi-Markov process. For this system, we obtain an inhomogeneous diffusion approximation results where the initial process is compensated by the averaging function in the average approximation scheme.