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Publications in Math-Net.Ru |
Citations |
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2023 |
1. |
M. Sh. Burlutskaya, M. B. Zvereva, M. I. Kamenskii, “Boundary Value Problem on a Geometric Star-Graph with a Nonlinear Condition at a Node”, Mat. Zametki, 114:2 (2023), 316–320 ; Math. Notes, 114:2 (2023), 275–279 |
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2021 |
2. |
M. Sh. Burlutskaya, A. V. Kiseleva, Ya. P. Korzhova, “Classical solution of the mixed problem for the wave equation on a graph with two edges and a cycle”, Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 194 (2021), 78–91 |
3. |
M. Sh. Burlutskaya, “Some properties of functional-differential operators with involution $\nu(x)=1-x$ and their applications”, Izv. Vyssh. Uchebn. Zaved. Mat., 2021, no. 5, 89–97 ; Russian Math. (Iz. VUZ), 65:5 (2021), 69–76 |
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2019 |
4. |
M. Sh. Burlutskaya, “Classical and generalized solutions of a mixed problem for a system of first-order equations with a continuous potential”, Zh. Vychisl. Mat. Mat. Fiz., 59:3 (2019), 380–390 ; Comput. Math. Math. Phys., 59:3 (2019), 355–365 |
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2016 |
5. |
M. Sh. Burlutskaya, “A mixed problem for a system of first order differential equations with continuous potential”, Izv. Saratov Univ. Math. Mech. Inform., 16:2 (2016), 145–151 |
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2015 |
6. |
M. Sh. Burlutskaya, A. P. Khromov, “The resolvent approach for the wave equation”, Zh. Vychisl. Mat. Mat. Fiz., 55:2 (2015), 229–241 ; Comput. Math. Math. Phys., 55:2 (2015), 227–239 |
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2014 |
7. |
A. P. Khromov, M. Sh. Burlutskaya, “Classical solution by the Fourier method of mixed problems with minimum requirements on the initial data”, Izv. Saratov Univ. Math. Mech. Inform., 14:2 (2014), 171–198 |
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8. |
M. Sh. Burlutskaya, A. P. Khromov, “Mixed problem for simplest hyperbolic first order equations with involution”, Izv. Saratov Univ. Math. Mech. Inform., 14:1 (2014), 10–20 |
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9. |
M. Sh. Burlutskaya, “Mixed problem for a first-order partial differential equation with involution and periodic boundary conditions”, Zh. Vychisl. Mat. Mat. Fiz., 54:1 (2014), 3–12 ; Comput. Math. Math. Phys., 54:1 (2014), 1–10 |
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2013 |
10. |
M. Sh. Burlutskaya, “Jordan–Dirichlet theorem for functional differential operator with involution”, Izv. Saratov Univ. Math. Mech. Inform., 13:3 (2013), 9–14 |
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2012 |
11. |
M. Sh. Burlutskaya, V. P. Kurdyumov, A. P. Khromov, “Refined asymptotic formulas for eigenvalues and eigenfunctions of the Dirac system with nondifferentiable potential”, Izv. Saratov Univ. Math. Mech. Inform., 12:3 (2012), 22–30 |
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12. |
M. Sh. Burlutskaya, V. V. Kornev, A. P. Khromov, “Dirac system with non-differentiable potential and periodic boundary conditions”, Zh. Vychisl. Mat. Mat. Fiz., 52:9 (2012), 1621–1632 |
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2011 |
13. |
M. Sh. Burlutskaya, A. P. Khromov, “Substantiation of Fourier method in mixed problem with involution”, Izv. Saratov Univ. Math. Mech. Inform., 11:4 (2011), 3–12 |
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14. |
M. Sh. Burlutskaya, A. P. Khromov, “The Steinhaus Theorem on Equiconvergence for Functional-Differential Operators”, Mat. Zametki, 90:1 (2011), 22–33 ; Math. Notes, 90:1 (2011), 20–31 |
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15. |
M. Sh. Burlutskaya, A. P. Khromov, “Fourier method in an initial-boundary value problem for a first-order partial differential equation with involution”, Zh. Vychisl. Mat. Mat. Fiz., 51:12 (2011), 2233–2246 ; Comput. Math. Math. Phys., 51:12 (2011), 2102–2114 |
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2009 |
16. |
M. Sh. Burlutskaya, A. P. Khromov, “On the same theorem on a equiconvergence at the whole segment for the functional-differential operators”, Izv. Saratov Univ. Math. Mech. Inform., 9:4(1) (2009), 3–10 |
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2008 |
17. |
M. Sh. Burlutskaya, “The theorem on equiconvergence for the integral operator on simplest graph with cycle”, Izv. Saratov Univ. Math. Mech. Inform., 8:4 (2008), 8–13 |
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18. |
M. Sh. Burlutskaya, A. P. Khromov, “On the equiconvergence of expansions for the certain class of the functional-differential operators with involution on the graph”, Izv. Saratov Univ. Math. Mech. Inform., 8:1 (2008), 9–14 |
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2007 |
19. |
M. Sh. Burlutskaya, A. P. Khromov, “On convergence of Riesz means of the expansions in eigenfunctions of a functional-differential operator on
a cycle-graph”, Izv. Saratov Univ. Math. Mech. Inform., 7:1 (2007), 3–8 |
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