Вовчанський Микола Богданович
Публікації
1. V. Prymirenko, A. Demianiuk, A. Pilipenko, M. Vovchanskyi, ''Formation of a heterogeneous group of UAVs with a reasonable number of false and real drones'', Radioelectronic and Computer Systems, [S.l.], v. 2024, n. 3, p. 80-95, 2024, https://doi.org/10.32620/reks.2024.3.06
2. M.B. Vovchanskyi, A quick probability-oriented introduction to operator splitting methods, Theory Stoch. Process., vol. 28, no.1, pp. 50--110, 2024, https://doi.org/10.3842/tsp-2024-28(44)-1
3. M.B. Vovchanskyi, ''Splitting-up for homeomorphic and coalescing stochastic flows'', ESAIM Prob. Stat., vol. 28, pp. 75--109, 2024, https://doi.org/10.1051/ps/2024004
4. A.A. Dorogovtsev and M.B. Vovchanskyi, ''On 1-point densities for Arratia flows with drift'', Stochastics, vol. 95, no. 8, pp. 1429--1445, 2023, https://doi.org/10.1080/17442508.2023.2211189
5. A.A. Dorogovtsev and M.B. Vovchanskii, ''On the approximations of point measures associated with the Brownian web by means of the fractional step method and discretization of the initial interval'', Ukr Math J, vol. 72, pp. 1358--1376, 2021, https://doi.org/10.1007/s11253-021-01862-w (also published in Ukrain. Math. J., vol. 72, no. 9, pp. 1179-1194, 2020)
6. A.A. Dorogovtsev and N.B. Vovchanskii, ''Representations of the finite-dimensional point densities in Arratia flows with drift'', Theory Stoch. Process., vol. 25, no. 1, pp. 25-36, 2020, https://doi.org/10.37863/tsp-2020-25(41)-1
7. M.B. Vovchanskii, Convergence of solution of SDEs to Harris flows, Theory Stoch. Process., vol. 23, no. 2, pp. 80--91, 2018
8. A.A. Dorogovtsev and N.B. Vovchanskii, Arratia flow with drift and Trotter formula for Brownian web, Communications on Stochastic Analysis, Volume 12, no 1, 2018, https://doi.org/10.31390/cosa.12.1.07
9. K. Goncharova, G. Skibo, ..., M.B. Vovchanskii, S.G. Pierzynowski, Diet-induced changes in brain structure and behavior in old gerbils, Nutrition and Diabetes, 5(6):e163, 2015, https://doi.org/10.1038/nutd.2015.13
10. A.A. Dorogovtsev, A. Gnedin and M.B. Vovchanskii, Iterated logarithm law for sizes of clusters in Arratia flow, Theory of Stochastic Processes 18(2), 2013
11. M. Vovchanskyi and V. Kliuchnikov, On continual trees arising as trajectories of systems of coalescing diffusion particles, Mathematics today, issue 14, 2008
2. M.B. Vovchanskyi, A quick probability-oriented introduction to operator splitting methods, Theory Stoch. Process., vol. 28, no.1, pp. 50--110, 2024, https://doi.org/10.3842/tsp-2024-28(44)-1
3. M.B. Vovchanskyi, ''Splitting-up for homeomorphic and coalescing stochastic flows'', ESAIM Prob. Stat., vol. 28, pp. 75--109, 2024, https://doi.org/10.1051/ps/2024004
4. A.A. Dorogovtsev and M.B. Vovchanskyi, ''On 1-point densities for Arratia flows with drift'', Stochastics, vol. 95, no. 8, pp. 1429--1445, 2023, https://doi.org/10.1080/17442508.2023.2211189
5. A.A. Dorogovtsev and M.B. Vovchanskii, ''On the approximations of point measures associated with the Brownian web by means of the fractional step method and discretization of the initial interval'', Ukr Math J, vol. 72, pp. 1358--1376, 2021, https://doi.org/10.1007/s11253-021-01862-w (also published in Ukrain. Math. J., vol. 72, no. 9, pp. 1179-1194, 2020)
6. A.A. Dorogovtsev and N.B. Vovchanskii, ''Representations of the finite-dimensional point densities in Arratia flows with drift'', Theory Stoch. Process., vol. 25, no. 1, pp. 25-36, 2020, https://doi.org/10.37863/tsp-2020-25(41)-1
7. M.B. Vovchanskii, Convergence of solution of SDEs to Harris flows, Theory Stoch. Process., vol. 23, no. 2, pp. 80--91, 2018
8. A.A. Dorogovtsev and N.B. Vovchanskii, Arratia flow with drift and Trotter formula for Brownian web, Communications on Stochastic Analysis, Volume 12, no 1, 2018, https://doi.org/10.31390/cosa.12.1.07
9. K. Goncharova, G. Skibo, ..., M.B. Vovchanskii, S.G. Pierzynowski, Diet-induced changes in brain structure and behavior in old gerbils, Nutrition and Diabetes, 5(6):e163, 2015, https://doi.org/10.1038/nutd.2015.13
10. A.A. Dorogovtsev, A. Gnedin and M.B. Vovchanskii, Iterated logarithm law for sizes of clusters in Arratia flow, Theory of Stochastic Processes 18(2), 2013
11. M. Vovchanskyi and V. Kliuchnikov, On continual trees arising as trajectories of systems of coalescing diffusion particles, Mathematics today, issue 14, 2008