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Публикации в базе данных Math-Net.Ru |
Цитирования |
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2024 |
1. |
A. Tani, M. Tani, “Classical solvability to the two-phase free boundary problem for a foam drainage equation”, Алгебра и анализ, 36:3 (2024), 239–288 |
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2022 |
2. |
А. Тани, “On phase-field equations of Penrose-Fife type with non-conserved order parameter under flux boundary condition. II: Uniform boundedness”, Математические заметки СВФУ, 29:2 (2022), 88–100 |
3. |
A. Tani, “On phase-field equations of Penrose-Fife type withthe non-conserved order parameter under flux boundary condition.I: Global-in-time solvability”, Математические заметки СВФУ, 29:1 (2022), 103–121 |
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2021 |
4. |
Atusi Tani, Hisasi Tani, “On the uniqueness of the classical solutions of the radial viscous fingering problems in a Hele-Shaw cell”, Журн. СФУ. Сер. Матем. и физ., 14:4 (2021), 475–482 |
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2019 |
5. |
N. P. Lazarev, A. Tani, P. Sivtsev, “Optimal radius of a rigid cylindrical inclusion in nonhomogeneous plates with a crack”, Математические заметки СВФУ, 26:1 (2019), 46–58 |
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2018 |
6. |
A. Tani, H. Tani, “Classical solvability of the radial viscous fingering problem in a Hele–Shaw cell”, Математические заметки СВФУ, 25:3 (2018), 92–114 |
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2008 |
7. |
Sh. Itoh, N. Tanaka, A. Tani, “Stability of steady-states solution to Navier–Stokes equations with general Navier slip boundary condition”, Зап. научн. сем. ПОМИ, 362 (2008), 153–175 ; J. Math. Sci. (N. Y.), 159:4 (2009), 472–485 |
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2003 |
8. |
A. Tani, C. Le Roux, “Steady-state solutions to the equations of motion of second-grade fluids with general Navier-type slip boundary conditions in Hölder spaces”, Зап. научн. сем. ПОМИ, 306 (2003), 210–228 ; J. Math. Sci. (N. Y.), 130:4 (2005), 4899–4909 |
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1990 |
9. |
В. А. Солонников, А. Тани, “Задача со свободной границей для уравнений Навье–Стокса для сжимаемой жидкости при наличии поверхностного натяжения”, Зап. научн. сем. ЛОМИ, 182 (1990), 142–148 ; V. A. Solonnikov, A. Tani, “Free boundary problem for the Navier–Stokes equations for a compressible fluid with a surface tension”, J. Soviet Math., 62:3 (1992), 2814–2818 |
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