Zingerman Konstantin Moiseevich

Publications in Math-Net.Ru

1. Calculation of the stress-strain state in a pre-loaded elastoplastic body with the sequential formation of cavities based on the theory of repeated superposition of large deformations
   
   Chebyshevskii Sb., 25:4 (2024),  239–249
2. Numeric modeling of forced multistage growth of a hole in elastoplastic solid under superimposed large strains
   
   Chebyshevskii Sb., 25:4 (2024),  228–238
3. Topology optimization of structural elements using gradient method with account for the material's structural inhomogeneity
   
   Chebyshevskii Sb., 23:4 (2022),  308–326
4. Exact solution to the problem of stage-by-stage deformation of a multilayer cylinder made of incompressible hypoelastic material
   
   Chebyshevskii Sb., 23:4 (2022),  262–271
5. Exact analytical solution for a problem of equilibrium of a composite plate containing prestressed parts made of incompressible elastic materials under superimposed finite strains
   
   Chebyshevskii Sb., 23:4 (2022),  251–261
6. Legendre spectral element for plastic localization problems at large scale strains
   
   Chebyshevskii Sb., 21:3 (2020),  306–316
7. Numerical estimation of effective properties of periodic cellular structures using beam and shell finite elements with CAE Fidesys
   
   Chebyshevskii Sb., 20:2 (2019),  523–536
8. Dynamic effects in lattice structures produced by additive technologies
   
   Chebyshevskii Sb., 20:2 (2019),  512–522
9. An approach to the analysis of propagation of elastic waves in grids made of rods of varying curvature
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 161:3 (2019),  365–376
10. A model of material microstructure formation on selective laser sintering with allowance for large elastoplastic strains
    
    Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 161:2 (2019),  191–204
11. Exact solutions of problems of the theory of repeated superposition of large strains for bodies created by successive junction of strained parts
    
    Chebyshevskii Sb., 18:3 (2017),  255–279
12. Account for incompressibility in the stress analysis near viscoelastic inclusion in a viscoelastic solid under finite strains
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2016, no. 2,  107–121
13. Exact Solution Of One Dynamic Problem In The Elasticity Theory Under Finite Strains
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2013, no. 3,  19–25
14. Numerical Modeling Of Solid-State Phase Transformations With Surface Tension In Case Of Finite Strains
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2013, no. 2,  15–27
15. On Parallel Computing Algorithms For The Assessment Of Effective Mechanical Properties Of Porous Materials
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2013, no. 1,  7–18
16. Comparative analysis of various Uzawa algorithm's implementations in problems of elasticity for incompressible materials
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2012, no. 3,  29–34
17. Some problems on the formation of concentrators in nonlinear viscoelastic material under finite deformations and their superposition and solution methods
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2012, no. 2,  15–27
18. Algorithm And Results Of Solving The Problem Of Nonlinear Elasticity For Finite Deformations For The Case When Parts Of The Body Boundary Are Given In Different States
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2012, no. 1,  19–24
19. Algorithm and CAE FIDESYS program module development for one contact task of thermoelasticity
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2011, no. 20,  21–28
20. Calculation of stresses near elastic inclusion with interphase layer at finite strains
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2010, no. 19,  7–12
21. Nonlinear model of the formation of rigid inclusions in an infinitely extended elastic solid and methods of its investigation
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2009, no. 14,  37–44
22. A version of the model of phase transformation in the solids with finite strains. Numerical experiment
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2009, no. 13,  23–30
23. On the application of the Newton-Kantorovich method to the solution of the problem of stress distribution in a body with elastic inclusions for finite strains
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2008, no. 9,  5–14
24. Numerical-analytical modeling of a stress-strain state near rigid inclusions in a body of nonlinear elastic material with allowance for their mutual influence
    
    Vestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.], 2007, no. 7,  89–98
25. On estimation of effective characteristics of porous materials under large deformations
    
    Vestnik Moskov. Univ. Ser. 1. Mat. Mekh., 1996, no. 6,  48–50