Tsybulin Vyacheslav Georgievich

Publications in Math-Net.Ru

1. Compact finite difference scheme for anisotropic convection Darcy
   
   Computer Research and Modeling, 17:2 (2025),  199–211
2. Simulation of the convection in a porous medium in polar coordinates on a non-uniform grid
   
   Mat. Model., 37:3 (2025),  127–143
3. High order accuracy scheme for modeling the dynamics of predator and prey in heterogeneous environment
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 32:3 (2024),  294–304
4. Mathematical model of ideal free distribution in the predator–prey system
   
   CMFD, 69:2 (2023),  237–249
5. A dynamic analysis of a prey – predator – superpredator system: a family of equilibria and its destruction
   
   Computer Research and Modeling, 15:6 (2023),  1601–1615
6. Mathematical model of three competing populations and multistability of periodic regimes
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 31:3 (2023),  316–333
7. Modeling of competition between populations with multi-taxis
   
   Sib. Zh. Ind. Mat., 26:3 (2023),  14–25
8. High order finite difference scheme for the plane problem of convection in a porous medium
   
   Taurida Journal of Computer Science Theory and Mathematics, 2023, no. 4,  92–102
9. Mathematical model of the ideal distribution of related species in a nonhogeneous environment
   
   Vladikavkaz. Mat. Zh., 25:2 (2023),  78–88
10. Multistability for a mathematical model of the dynamics of predators and preys in a heterogeneous area
    
    CMFD, 68:3 (2022),  509–521
11. Multistability for system of three competing species
    
    Computer Research and Modeling, 14:6 (2022),  1325–1342
12. Diffusion-reaction-advection equations for the predator-prey system in a heterogeneous environment
    
    Computer Research and Modeling, 13:6 (2021),  1161–1176
13. Multi-stable scenarios for differential equations describing the dynamics of a predators and preys system
    
    Computer Research and Modeling, 12:6 (2020),  1451–1466
14. Multistability and memory effects in dynamical system with cosymmetric potential
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 28:3 (2020),  259–273
15. Mathematical model of political differentiation under social tension
    
    Computer Research and Modeling, 11:5 (2019),  999–1012
16. Modeling of anisotropic convection for the binary fluid in porous medium
    
    Computer Research and Modeling, 10:6 (2018),  801–816
17. Regarding the dynamics of cosymmetric predator - prey systems
    
    Computer Research and Modeling, 9:5 (2017),  799–813
18. Numerical simulation of convective motion in an anisotropic porous medium and cosymmetry conservation
    
    Zh. Vychisl. Mat. Mat. Fiz., 57:10 (2017),  1734–1747
19. The cosymmetric approach to the analysis of spatial structure of populations with amount of taxis
    
    Computer Research and Modeling, 8:4 (2016),  661–671
20. Modeling of spatial-temporal migration for closely related species
    
    Computer Research and Modeling, 3:4 (2011),  477–488
21. Convective motions in a porous ring sector
    
    Prikl. Mekh. Tekh. Fiz., 52:3 (2011),  116–125
22. Семейство стационарных режимов в модели динамики популяций
    
    Sib. Zh. Ind. Mat., 12:1 (2009),  98–108
23. Dynamics of population kinetics model with cosymmetry
    
    Mat. Model., 20:2 (2008),  85–92
24. Calculation of families of stationary filtration convection regimes in a narrow container
    
    Prikl. Mekh. Tekh. Fiz., 44:2 (2003),  92–100
25. A spectral-difference method for computing convective motions of a fluid in a porous medium, and cosymmetry preservation
    
    Zh. Vychisl. Mat. Mat. Fiz., 42:6 (2002),  913–923


26. On the 75th anniversary of the birth of Vladimir Andreevich Lukyanenko
    
    Taurida Journal of Computer Science Theory and Mathematics, 2024, no. 1,  7–12
27. Nonlinear dynamics of the predator - prey system in a heterogeneous habitat and scenarios of local interaction of species
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 29:5 (2021),  751–764