22 citations to https://www.mathnet.ru/rus/tmf1093
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V. V. Obukhov, S. V. Chervon, D. V. Kartashov, “Solutions of Maxwell equations for admissible electromagnetic fields, in spaces with simply transitive four-parameter groups of motions”, Int. J. Geom. Methods Mod. Phys., 21:05 (2024)
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V. V. Obukhov, “Hamilton-Jacobi and Klein-Gordon-Fock equations for a charged test particle in space-time with simply transitive four-parameter groups of motions”, Journal of Mathematical Physics, 64:9 (2023)
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Valeriy V. Obukhov, “Exact Solutions of Maxwell Equations in Homogeneous Spaces with the Group of Motions G3(VIII)”, Symmetry, 15:3 (2023), 648
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Valeriy V. Obukhov, “Exact Solutions of Maxwell Equations in Homogeneous Spaces with the Group of Motions G3(IX)”, Axioms, 12:2 (2023), 135
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Obukhov V.V., “Algebras of Integrals of Motion For the Hamilton-Jacobi and Klein-Gordon-Fock Equations in Spacetime With Four-Parameter Groups of Motions in the Presence of An External Electromagnetic Field”, J. Math. Phys., 63:2 (2022), 023505
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Obukhov V.V., “<P>Algebra of the Symmetry Operators of the Klein-Gordon-Fock Equation For the Case When Groups of Motions G(3) Act Transitively on Null Subsurfaces of Spacetime</P>”, Symmetry-Basel, 14:2 (2022), 346
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Valery V. Obukhov, “Maxwell's Equations in Homogeneous Spaces for Admissible Electromagnetic Fields”, Universe, 8:4 (2022), 245
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V. V. Obukhov, “Maxwell Equations in Homogeneous Spaces with Solvable Groups of Motions”, Symmetry, 14:12 (2022), 2595
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Magazev A.A. Boldyreva M.N., “Schrodinger Equations in Electromagnetic Fields: Symmetries and Noncommutative Integration”, Symmetry-Basel, 13:8 (2021), 1527
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Obukhov V.V. Myrzakulov K.R. Guselnikova U.A. Zhadyranova A., “Algebras of Symmetry Operators of the Klein-Gordon-Fock Equation For Groups Acting Transitively on Two-Dimensional Subspaces of a Space-Time Manifold”, Russ. Phys. J., 64:7 (2021), 1320–1327