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Литература
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X. Feng, M. Neilan, “Finite element methods for a bi-wave equation modeling d-wave superconductors”, J. Comput. Math., 28:3 (2010), 331–353   |
| 2. |
X. Feng, M. Neilan, “Discontinuous finite element methods for a bi-wave equation modeling d-wave superconductors”, Math. Comput., 80:275 (2011), 1303–1333  |
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W. I. Fushchych, O. V. Roman, R. Z. Zhdanov, “Symmetry reduction and some exact solutions of nonlinear biwave equations”, Rep. Math. Phys., 37:2 (1996), 267–281  |
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V. I. Korzyuk, E. S. Cheb, “The Cauchy problem for a fourth-order equation with a bi-wave operator”, Differential Equations, 43 (2007), 688–695 |
| 5. |
V. Korzyuk, O. Konopelko, E. Cheb, “Boundary-value problems for fourth-order equations of hyperbolic and composite types”, Journal of Mathematical Sciences, 171 (2010), 89–115 |
| 6. |
Korzyuk V. I., Vinh N. V., Minh N. T., “Classical solution of the Cauchy problem for biwave equation: Application of Fourier transform”, Mathematical Modelling and Analysis, 17:5 (2012), 630–641 |
| 7. |
Korzyuk V. I., Vinh N. V., “Classical solutions of mixed problems for the one-dimensional biwave equation”, Proceedings of the National Academy of Sciences of Belarus. Physics and Mathematics Series, 2016, no. 1, 69–79 (In Russian) |
| 8. |
Korzyuk V. I., Vinh N. V., “Classical solution of a problem with an integral condition for the one-dimensional biwave equation”, Proceedings of the National Academy of Sciences of Belarus. Physics and Mathematics Series, 2016, no. 3, 16–29 (In Russian) |
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Korzyuk V. I., Vinh N. V., “Cauchy problem for some fourth-order nonstrictly hyperbolic equations”, Nanosystems: Physics, Chemistry, Mathematics, 7:5 (2016), 869–879 |
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V. I. Korzyuk, N. V. Vinh, N. T. Minh, “Conservation law for the Cauchy-Navier equation of elastodynamics wave via Fourier transform”, Tr. Inst. Mat., 24:1 (2016), 100–106 |
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N. I. Muskhelishvili, Some basic problems of the mathematical theory of elasticity, Noordhoff International Publishing, 2010 |
| 12. |
Elena Obolashvili, Higher Order Partial Differential Equations in Clifford Analysis: Effective Solutions to Problems, Birkhauser, Basel, 2003 |
