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Publications in Math-Net.Ru
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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
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Iterative method for solving a non-linear edge problems with a point source
Izv. Vyssh. Uchebn. Zaved. Mat., 2022, no. 5, 74–79
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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
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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
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Solvability of a multivalued filtering problem in a heterogeneous environment with a distributed source
Izv. Vyssh. Uchebn. Zaved. Mat., 2011, no. 12, 76–80
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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
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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
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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
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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
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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
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On the convergence of the dual-type iterative method for mixed variational inequalities
Differ. Uravn., 42:8 (2006), 1115–1122
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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
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Analysis of the Stationary Filtration Problem with a Multivalued Law in the Presence of a Point Source
Differ. Uravn., 41:7 (2005), 874–880
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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
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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
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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
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A Study of Variable Step Iterative Methods for Variational Inequalities of the Second Kind
Differ. Uravn., 40:7 (2004), 908–919
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A Decomposition Method for Variational Inequalities of the Second Kind with Strongly Inverse-Monotone Operators
Differ. Uravn., 39:7 (2003), 888–895
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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
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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
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Construction and Convergence Analysis of Iterative Methods for Variational Problems with a Nondifferentiable Functional
Differ. Uravn., 38:7 (2002), 930–935
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Convergence Analysis of Iterative Methods for Some Variational Inequalities with Pseudomonotone Operators
Differ. Uravn., 37:7 (2001), 891–898
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The strong convergence of the iteration method for operators with degeneracy
Zh. Vychisl. Mat. Mat. Fiz., 37:12 (1997), 1424–1426
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Investigation of the convergence of an iterative process for equations with degenerate operators
Differ. Uravn., 32:7 (1996), 898–901
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Investigation of the solvability of stationary problems for latticed shells
Izv. Vyssh. Uchebn. Zaved. Mat., 1992, no. 11, 3–7
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Inverse problem for the Hill equation. Numerical experiments
Issled. Prikl. Mat., 16 (1989), 74–80
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