Yang Tong | Depart Of Mathematics City University Of Hong Kong
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概要
関連著者
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Yang Tong
Depart Of Mathematics City University Of Hong Kong
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森本 芳則
京都大学人間・環境学研究科
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西原 健二
早稲田大学政治経済学術院
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Yang Tong
Depart of Mathematics, City University of Hong Kong
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Zhao Huijiang
Wuhan Institute of Physics and Mathematics, The Chinese Academy of Science
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Zhao Huijiang
Wuhan Institute Of Physics And Mathematics The Chinese Academy Of Science
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Enpuku Keiji
Department Of Electrical And Electronic Systems Engineering Faculty Of Information Science And Elect
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Yang Tong
Department Of Mathematics City University Of Hong Kong
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Yang Tong
Department Of Electronics Kyushu University
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Wang Jinghua
Institute Of Systems Science Academia Sinica
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Ying Lung-an
Institute Of Mathematics Peking University
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LIU Hailiang
Department of Mathematics, Henan Normal University
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鵜飼 正二
Liu Bie Ju Centre For Mathematical Sciences City University Of Hong Kong
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ZHU Changjiang
Department of Mathematics, Central China Normal University
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Huo Zhaohui
Department of Mathematics, City University of Hong Kong
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森本 芳則
京都大学人間環境学研究科
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Zhu Changjiang
Department Of Mathematics Central China Normal University
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Huo Zhaohui
Department Of Mathematics City University Of Hong Kong
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Liu Hailiang
Department Of Mathematics Henan Normal University
著作論文
- Nonlinear Stability of Strong Rarefaction Waves for Compressible Navier-Stokes Equations (Mathematical Analysis in Fluid and Gas Dynamics)
- The Rate of Asymptotic Convergence of Strong Detonations for a Model Problem
- High T_c Superconducting Quantum Interference Device Magnetometer Utilizing Cooled Copper Pickup Coil and Resonant Coupling Circuit
- Regularity of solutions for spatially homogeneous Boltzmann equation without angular cutoff : non Maxwellian molecule type (Mathematical Analysis in Fluid and Gas Dynamics)
- Nonlinear Stability and Existence of Stationary Discrete Travelling Waves for the Relaxing Schemes
- Local solutions with polynomial decay in the velocity variables to the Boltzmann equation for soft potentials (Mathematical Analysis in Fluid and Gas Dynamics)