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Publications in Math-Net.Ru
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Method of generalized and combined computational grids for restoration the parameters of inhomogeneities of a body based on the results of measurements of the electromagnetic field
Matem. Mod., 36:4 (2024), 24–36
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An iterative scheme for solving a Lippmann - Schwinger nonlinear integral equation by the Galerkin method
University proceedings. Volga region. Physical and mathematical sciences, 2023, no. 3, 66–73
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A problem of reconstruction of inhomogeneity parameters of a two-dimension body by the measurement results of acoustic field
University proceedings. Volga region. Physical and mathematical sciences, 2023, no. 2, 11–18
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Solution of a scalar two-dimensional nonlinear diffraction problem for objects of arbitrary shape
Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 165:2 (2023), 167–177
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The solution of a vector 3D inverse diffraction ploblem on a 3D heterogeneous body by a two-sweep method
University proceedings. Volga region. Physical and mathematical sciences, 2020, no. 4, 3–21
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Two-step method for solving the scalar reverse three-dimensional diffraction problem on a volume heterogeneous body
University proceedings. Volga region. Physical and mathematical sciences, 2019, no. 4, 12–28
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The inverse problem of determining the inhomogeneity parameters of bodies located in free space
University proceedings. Volga region. Physical and mathematical sciences, 2018, no. 4, 50–61
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The inverse problem of body's heterogeneity recovery for early diagnostics of diseases using microwave tomography
University proceedings. Volga region. Physical and mathematical sciences, 2017, no. 4, 3–17
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The problem of diffraction of acoustic waves on a system of bodyes, screens and antennas
Matem. Mod., 29:1 (2017), 109–118
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Comparison of numerical methods for solving integral-differential equation of electromagnetic field
University proceedings. Volga region. Physical and mathematical sciences, 2016, no. 1, 3–12
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Inverse problem of determining parameters of inhomogeneity of a body from acoustic field measurements
Zh. Vychisl. Mat. Mat. Fiz., 56:3 (2016), 490–497
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Existence and unicity of the solution of the diffraction problem for an electromagnetic wave on a system of non-intersecting bodies and screens
University proceedings. Volga region. Physical and mathematical sciences, 2015, no. 1, 89–97
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Solution of integral equations by means of subhierarchic method for generalized computational grids
Matem. Mod., 27:4 (2015), 81–96
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The iteration method for solving direct and inverse two-dimensional acoustic problems
University proceedings. Volga region. Physical and mathematical sciences, 2014, no. 4, 28–36
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Numerical solution of the electromagnetic wave difraction problem on the sytem of bodies and screens
University proceedings. Volga region. Physical and mathematical sciences, 2014, no. 3, 114–133
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Scalar problem of plane wave diffraction by a system of nonintersecting screens and inhomogeneous bodies
Zh. Vychisl. Mat. Mat. Fiz., 54:8 (2014), 1319–1331
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Ellipticity of the electric field integral equation for absorbing media and the convergence of the Rao–Wilton–Glisson method
Zh. Vychisl. Mat. Mat. Fiz., 54:1 (2014), 105–113
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Numerical solution of the problem of electromagnetic wave diffraction on the copound body, located in free space
University proceedings. Volga region. Physical and mathematical sciences, 2013, no. 2, 17–32
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Restoration of dielectric permittivity of a heterogeneous body placed into a rectangular waveguide according to transmission and reflection coefficients
University proceedings. Volga region. Physical and mathematical sciences, 2013, no. 1, 5–18
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Solving the inverse electromagnetic diffraction problem in
rectangular waveguide using the method of asymptotic integral
equations
Zhurnal SVMO, 15:3 (2013), 148–157
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Calculating the surface currents in electromagnetic scattering by screens of complex geometry
Zh. Vychisl. Mat. Mat. Fiz., 53:4 (2013), 615–623
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Solving the problem of electromagnetic wave diffraction on screens of complex shape
University proceedings. Volga region. Physical and mathematical sciences, 2012, no. 4, 59–72
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A sub-hierarchical method for solving the problem of diffraction of electromagnetic waves on non-planar screens of complex geometric shape using the basic functions of covers
University proceedings. Volga region. Physical and mathematical sciences, 2012, no. 4, 12–20
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Application of lid functions to solve the problem of diffraction of electromagnetic waves on screens of complex shape
University proceedings. Volga region. Physical and mathematical sciences, 2012, no. 3, 84–98
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A sub-hierarchical method for solving the problem of diffraction of an electromagnetic wave on a body located in free space
University proceedings. Volga region. Physical and mathematical sciences, 2012, no. 1, 83–91
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Application of the subhierarchic method in electrodynamic problems
Num. Meth. Prog., 13:1 (2012), 87–97
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Итерационный метод определения диэлектрической проницаемости образца неоднородного материала, расположенного в прямоугольном волноводе
Zh. Vychisl. Mat. Mat. Fiz., 52:12 (2012), 2228–2237
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Numerical solution to the problem of diffraction of electromagnetic waves on a dielectric body located in a rectangular resonator
University proceedings. Volga region. Physical and mathematical sciences, 2011, no. 3, 22–31
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Iterative method for determining the effective dielectric constant of a non-uniform material sample
University proceedings. Volga region. Physical and mathematical sciences, 2011, no. 3, 3–13
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Collocation method for solving the problem of diffraction of electromagnetic waves on a dielectric body located in a resonator
University proceedings. Volga region. Physical and mathematical sciences, 2011, no. 2, 28–40
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Some analytical solutions to the Neumann problem on a disk for the Helmholtz equation
University proceedings. Volga region. Physical and mathematical sciences, 2011, no. 1, 31–39
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A sub-hierarchical method for solving the Lippmann-Schwinger integral equation
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 4, 82–88
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Numerical and analytical solution of the problem of electromagnetic field diffraction on two sections with different permittivity located in a rectangular waveguide
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 4, 73–81
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A sub-hierarchical method for solving an integral equation on surfaces of arbitrary shape
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 3, 88–94
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Numerical and analytical solution of the problem of electromagnetic field diffraction on a dielectric parallelepiped located in a rectangular waveguide
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 2, 44–53
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A sub-hierarchical approach for solving the volumetric singular integral equation of the diffraction problem on a dielectric body in a waveguide by collocation
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 2, 32–43
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Numerical solution of the problem of propagation of electromagnetic TM waves in circular dielectric waveguides filled with a nonlinear medium
University proceedings. Volga region. Physical and mathematical sciences, 2010, no. 1, 2–13
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A parallel algorithm for computing surface currents in a screen electromagnetic diffraction problem
Num. Meth. Prog., 6:1 (2005), 99–108
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Numerical solution of a volumetric singular integral equation by the collocation method
University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 4, 54–69
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A sub-hierarchical method for solving an integral equation on flat screens of arbitrary shape
University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 4, 48–53
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A collocation method for solving a volumetric singular integral equation in the problem of determining the dielectric constant of a material
University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 3, 71–87
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A subierarchical method for solving a pseudodifferential equation in the diffraction problem in layers connected through a hole
University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 3, 59–70
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A numerical method for solving a pseudodifferential equation in the diffraction problem in layers connected through a hole
University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 1, 87–99
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Application of GRID technologies for solving a volumetric singular integral equation for the problem of diffraction on a dielectric body by the subierarchical method
University proceedings. Volga region. Physical and mathematical sciences, 2008, no. 2, 2–14
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