Mingalev Oleg Viktorovich

Publications in Math-Net.Ru

1. Simulation of propagation of video pulse signals of GPR in the Earth's lithosphere
   
   Mat. Model., 35:12 (2023),  31–50
2. Global circulation models of the Earth atmosphere. Achievements and directions of development
   
   Mat. Model., 32:11 (2020),  29–46
3. The explicit splitting scheme for Maxwell's equations
   
   Mat. Model., 30:12 (2018),  17–38
4. Reformulation of Vlasov–Maxwell system and a new method for its numerical solution
   
   Mat. Model., 30:10 (2018),  21–43
5. Solution of the cauchy problem for the three-dimensional telegraph equation and exact solutions of Maxwell’s equations in a homogeneous isotropic conductor with a given exterior current source
   
   Zh. Vychisl. Mat. Mat. Fiz., 58:4 (2018),  618–625
6. Gasdynamic general circulation model of the lower and middle atmosphere of the Earth
   
   Mat. Model., 29:8 (2017),  59–73
7. Two difference schemes for the numerical solution of Maxwell’s equations as applied to extremely and super low frequency signal propagation in the Earth-ionosphere waveguide
   
   Zh. Vychisl. Mat. Mat. Fiz., 54:10 (2014),  1656–1677
8. Generalization of the hybrid monotone second-order finite difference scheme for gas dynamics equations to the case of unstructured 3D grid
   
   Zh. Vychisl. Mat. Mat. Fiz., 50:5 (2010),  923–936
9. The numerical approximation of discrete Vlasov–Darwin model based on the optimal reformulation of field equations
   
   Mat. Model., 18:11 (2006),  117–125
10. A drift algorithm for the motion of a particle in the Darwin model of a plasma
    
    Zh. Vychisl. Mat. Mat. Fiz., 43:3 (2003),  467–480
11. A generalized newtonian rheological model for laminar and turbulent flows
    
    Mat. Model., 11:11 (1999),  39–63
12. Representations of general commutation relations. Asymptotics of the spectrum of three quantum Hamiltonians
    
    Dokl. Akad. Nauk, 352:2 (1997),  155–158
13. Representations of general commutation relations
    
    TMF, 113:3 (1997),  369–383
14. On discrete models of the quantum Boltzmann equation
    
    Mat. Sb., 184:11 (1993),  21–38
15. Solutions in the form of a traveling wave in a discrete model of the Uehling–Uhlenbeck equation
    
    Dokl. Akad. Nauk, 323:6 (1992),  1029–1033