Beshtokova Zaryana Vladimirovna

Publications in Math-Net.Ru

1. Stability and convergence of the locally one-dimensional scheme A. A. Samarskii, approximating the multidimensional integro-differential equation of convection-diffusion with inhomogeneous boundary conditions of the first kind
   
   Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.], 27:3 (2023),  407–426
2. Stability and convergence of difference schemes approximating the first boundary value problem for integral-differential parabolic equations in a multidimensional domain
   
   Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2023, no. 3,  77–91
3. A difference method for solving the convection-diffusion equation with a nonclassical boundary condition in a multidimensional domain
   
   Computer Research and Modeling, 14:3 (2022),  559–579
4. Finite-difference methods for solving a nonlocal boundary value problem for a multidimensional parabolic equation with boundary conditions of integral form
   
   Dal'nevost. Mat. Zh., 22:1 (2022),  3–27
5. On a difference scheme for solution of the Dirichlet problem for diffusion equation with a fractional Caputo derivative in the multidimensional case in a domain with an arbitrary boundary
   
   Vladikavkaz. Mat. Zh., 24:3 (2022),  37–54
6. Numerical method for solving a nonlocal boundary value problem for a multidimensional parabolic equation
   
   Num. Meth. Prog., 23:2 (2022),  153–171
7. Numerical method for solving an initial-boundary value problem for a multidimensional loaded parabolic equation of a general form with conditions of the third kind
   
   Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.], 26:1 (2022),  7–35
8. Grid method for approximate solution of initial-boundary value problems for generalized convection-diffusion equations
   
   Vladikavkaz. Mat. Zh., 23:3 (2021),  28–44
9. Finite-difference method for solving of a nonlocal boundary value problem for a loaded thermal conductivity equation of the fractional order
   
   Vladikavkaz. Mat. Zh., 22:4 (2020),  45–57
10. On the numerical solution of initial-boundary value problems for the convection-diffusion equation with a fractional Сaputo derivative and a nonlocal linear source
    
    Mathematical Physics and Computer Simulation, 23:4 (2020),  35–50
11. To nonlocal boundary value problems for a multidimensional parabolic equation with variable coefficients
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2019, no. 2,  107–122
12. Locally one-dimensional difference schemes for parabolic equations in media possessing memory
    
    Zh. Vychisl. Mat. Mat. Fiz., 58:9 (2018),  1531–1542
13. Locally one-dimensional scheme for parabolic equation of general type with nonlocal source
    
    News of the Kabardin-Balkar scientific center of RAS, 2017, no. 3,  5–12
14. Locally one-dimensional difference scheme for a fractional tracer transport equation
    
    Zh. Vychisl. Mat. Mat. Fiz., 57:9 (2017),  1517–1529
15. The local and one-dimensional differential scheme for the equation of transfer of passive impurity elements in the atmosphere
    
    News of the Kabardin-Balkar scientific center of RAS, 2016, no. 1,  12–19
16. Convergence of difference schemes for the diffusion equation in porous media with structures having fractal geometry
    
    News of the Kabardin-Balkar scientific center of RAS, 2014, no. 5,  17–27