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Publications in Math-Net.Ru |
Citations |
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2020 |
| 1. |
V. I. Korzyuk, I. S. Kozlovskaja, V. Yu. Sokolovich, “Solution of the wave equation in a quarter plane”, Tr. Inst. Mat., 28:1-2 (2020), 40–56  |
| 2. |
V. I. Korzyuk, I. S. Kozlovskaja, S. N. Naumavets, “Classical solutions of mixed problems for a one-dimensional wave equation in the class of smooth high-order functions”, Tr. Inst. Mat., 28:1-2 (2020), 32–39 |
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2019 |
| 3. |
V. I. Korzyuk, I. S. Kozlovskaja, S. N. Naumavets, “Statement of border tasks on the plane dependent on the coefficients for the type of the wave equation. III”, Tr. Inst. Mat., 27:1-2 (2019), 44–52 |
| 4. |
V. I. Korzyuk, I. S. Kozlovskaja, S. N. Naumavets, “Statement of border tasks on the plane dependent on the coefficients for the type of the wave equation. II”, Tr. Inst. Mat., 27:1-2 (2019), 37–43 |
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| 5. |
V. I. Korzyuk, I. S. Kozlovskaja, S. N. Naumavets, “Statement of border tasks on the plane dependent on the coefficients for the type of the wave equation. I”, Tr. Inst. Mat., 27:1-2 (2019), 29–36 |
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2011 |
| 6. |
V. I. Korzyuk, I. S. Kozlovskaya, “Two-point boundary problem for string oscillation equation with given velocity in arbitrary point of time. II”, Tr. Inst. Mat., 19:1 (2011), 62–70 |
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2010 |
| 7. |
V. I. Korzyuk, I. S. Kozlovskaya, “Two-point boundary problem for string oscillation equationwith given velocity in arbitrary point of time. I”, Tr. Inst. Mat., 18:2 (2010), 22–35  |
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1992 |
| 8. |
V. T. Erofeenko, I. S. Kozlovskaya, “Integral equations in problems of screening electromagnetic fields for cylindrical bodies”, Differ. Uravn., 28:2 (1992), 242–247  ; Differ. Equ., 28:2 (1992), 209–213 |
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