Zadvornov Oleg Anatol'evich

Publications in Math-Net.Ru

1. Mixed boundary value problem for a monotone equation with a lower order term and point sources on the right side
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 166:2 (2024),  173–186
2. Iterative method for solving a non-linear edge problems with a point source
   
   Izv. Vyssh. Uchebn. Zaved. Mat., 2022, no. 5,  74–79
3. Mathematical modeling of the equilibrium problem for a soft biological shell. I. Generalized statement
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 154:4 (2012),  57–73
4. On the smoothness properties of the solution of a nonlinear filtration problem in the presence of a point source
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 154:1 (2012),  162–166
5. Solvability of a multivalued filtering problem in a heterogeneous environment with a distributed source
   
   Izv. Vyssh. Uchebn. Zaved. Mat., 2011, no. 12,  76–80
6. Existence of solutions of filtration problems with multi-valued law in nonhomogeneous media in the presence of a point source
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 153:1 (2011),  168–179
7. Existence of solutions for quasilinear elliptic boundary value problem in the presence of point sources
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 152:1 (2010),  155–163
8. Existence of solution of the equilibrium soft network shell problem in the presence of a point load
   
   Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 152:1 (2010),  93–102
9. On Approximative Methods for Solving Quasi-Variational Inequalities of the Soft Network Shells Theory
   
   Kazan. Gos. Univ. Uchen. Zap. Ser. Fiz.-Mat. Nauki, 150:3 (2008),  104–116
10. Application of mixed schemes of the finite element method to the solution of problems of nonlinear filtration theory
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2007, no. 8,  16–26
11. On the convergence of the dual-type iterative method for mixed variational inequalities
    
    Differ. Uravn., 42:8 (2006),  1115–1122
12. On the iterative method for solving a variational inequalities with inversely strongly monotone operators
    
    Kazan. Gos. Univ. Uchen. Zap. Ser. Fiz.-Mat. Nauki, 148:3 (2006),  23–41
13. Analysis of the Stationary Filtration Problem with a Multivalued Law in the Presence of a Point Source
    
    Differ. Uravn., 41:7 (2005),  874–880
14. On the convergence of a semi-explicit method with splitting for solving variational inequalities of the second kind
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2005, no. 6,  61–70
15. Investigation of a nonlinear stationary problem of filtration in the presence of a point source
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2005, no. 1,  58–63
16. Investigation of the solvability of an axisymmetric problem of determining the equilibrium position of a soft shell of revolution
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2005, no. 1,  25–30
17. A Study of Variable Step Iterative Methods for Variational Inequalities of the Second Kind
    
    Differ. Uravn., 40:7 (2004),  908–919
18. A Decomposition Method for Variational Inequalities of the Second Kind with Strongly Inverse-Monotone Operators
    
    Differ. Uravn., 39:7 (2003),  888–895
19. Formulation and investigation of a stationary problem of the contact of a soft shell with an obstacle
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2003, no. 1,  45–52
20. Iterative methods for solving variational inequalities of the second kind with inversely strongly monotone operators
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2003, no. 1,  20–28
21. Construction and Convergence Analysis of Iterative Methods for Variational Problems with a Nondifferentiable Functional
    
    Differ. Uravn., 38:7 (2002),  930–935
22. Convergence Analysis of Iterative Methods for Some Variational Inequalities with Pseudomonotone Operators
    
    Differ. Uravn., 37:7 (2001),  891–898
23. The strong convergence of the iteration method for operators with degeneracy
    
    Zh. Vychisl. Mat. Mat. Fiz., 37:12 (1997),  1424–1426
24. Investigation of the convergence of an iterative process for equations with degenerate operators
    
    Differ. Uravn., 32:7 (1996),  898–901
25. Investigation of the solvability of stationary problems for latticed shells
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1992, no. 11,  3–7
26. Inverse problem for the Hill equation. Numerical experiments
    
    Issled. Prikl. Mat., 16 (1989),  74–80