Stability of Rayleigh Flow
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概要
- 論文の詳細を見る
The stability of a two-dimensional unsteady flow of an incompressible viscous fluid is investigated by the method of small perturbation theory. An incompressible fluid is bounded by an infinite plane surface. The basic flow is such that the plane is given an impulsive start and then moves with constant velocity in its own plane. By the use of Lin's procedure the relation between the Reynolds number of the basic flow which depends on time and the wave number of the neutral oscillation and also the minimum critical Reynolds number are calculated numerically.
- 社団法人日本物理学会の論文
- 1967-01-05
著者
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Kambe Tsutomu
Institute Of Space And Aeronautical Science University Of Tokyo
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Kambe Tsutomu
Institute Of Dynamical Systems
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NAKAYA Choji
Department of Physics, Faculty of Science, University of Tokyo
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Nakaya Choji
Department Of Physics Faculty Of Science University Of Tokyo
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Kambe Tsutomu
Institute of Space and Aeronautical Science, University of Tokyo
関連論文
- Interaction of Two Vortex Rings Moving along a Common Axis of Symmetry
- Geometrical theory of fluid flows and dynamical systems
- Generation and Decay of Viscous Vortex Rings
- Gauge principle for flows of an ideal fluid
- Geometrical theory of two-dimensional hydrodynamics with special reference to a system of point vortices
- Stability of Rayleigh Flow
- Stability of Generalized Rayleigh Flow
- Non-linear Stability of Liquid Flow down an Inclined Plane
- Stability of an Axisymmetric Wake