Zarubin Vladimir Stepanovich

Publications in Math-Net.Ru

1. Dual variational model of the temperature state of the disk of a unipolar generator
   
   Prikl. Mekh. Tekh. Fiz., 63:1 (2022),  113–121
2. Temperature state of a hollow cylinder made of a polymer dielectric with temperature-dependent characteristics
   
   Prikl. Mekh. Tekh. Fiz., 60:1 (2019),  69–78
3. The variational form of the mathematical model of a thermal explosion in a solid body with temperature-dependent thermal conductivity
   
   TVT, 56:2 (2018),  235–240
4. Application of mathematical modeling to obtaining thermoelastic characteristics of composite materials reinforced with nanostructure inclusions
   
   Matem. Mod., 29:10 (2017),  45–59
5. Temperature distribution in the spherical shell of a gauge-adjusting satellite
   
   Prikl. Mekh. Tekh. Fiz., 58:6 (2017),  149–157
6. Dual variational formulation of the electrostatic problem in an inhomogeneous anisotropic dielectric
   
   Vestnik Moskov. Univ. Ser. 1. Mat. Mekh., 2017, no. 3,  8–16
7. The variational approach to estimation of the dielectric permittivity of a unidirectional fibrous composite
   
   Vestnik Moskov. Univ. Ser. 1. Mat. Mekh., 2017, no. 1,  3–11
8. Critical and optimal thicknesses of thermal insulation in radiative–convective heat transfer
   
   TVT, 54:6 (2016),  883–888
9. Application of the least squares method to the problem of radiation transfer in a spherical cavity
   
   Mat. Mod. Chisl. Met., 2015, no. 8,  53–65
10. Radiative-conductive heat transfer in a spherical cavity
    
    TVT, 53:2 (2015),  243–249
11. Effective thermal conductivity of a composite in case of inclusions shape deviations from spherical ones
    
    Mat. Mod. Chisl. Met., 2014, no. 4,  3–17
12. Mechanical analog modeling of the inelastic non-isothermal deformation processes
    
    Mat. Mod. Chisl. Met., 2014, no. 3,  25–38
13. Special features of mathematical modeling of technical instruments
    
    Mat. Mod. Chisl. Met., 2014, no. 1,  5–17
14. Two-sided estimates for thermal resistance of an inhomogeneous solid body
    
    TVT, 51:4 (2013),  578–585
15. Mathematical simulation of the temperature state of an inhomogeneous body
    
    TVT, 45:2 (2007),  277–288
16. Mathematical modeling of thermomechanical processes under intense thermal effect
    
    TVT, 41:2 (2003),  300–309
17. A thermomechanical model of a relaxing solid body subjected to time-dependent loading
    
    Dokl. Akad. Nauk, 345:2 (1995),  193–195


18. К 150-летию математической подготовки в МГТУ им. Н.Э. Баумана
    
    Matem. Mod., 29:10 (2017),  3–4