Slow Motion in Shear Flow of a Doublet of Two Spheres in Contact
スポンサーリンク
概要
- 論文の詳細を見る
The exact solution of the stokes equations for fluid motion around two spheres in contact is given in the most general flow situation. By use of this solution the behavior in shear flow of a doublet composed of two equal-sized spheres in contact is considered. Numerical calculation is carried out, and the motion of the doublet and the rate of energy dissipation are compared with the known case of spheroid.
- 社団法人日本物理学会の論文
- 1971-11-05
著者
-
Wakiya Shoichi
Faculty Of Engineering Niigata University
-
Wakiya Shoichi
Faculty Of Engineering Nagoya University
関連論文
- Viscous Flow in a Bifurcate Channel
- Periodic Motions of a Viscous Fluid past a Sphere in a Cylindrical Tube
- Slow Motion in Shear Flow of a Doublet of Two Spheres in Contact
- Effect of a Plane Wall on the Impulsive Motion of a Sphere in a Viscous Fluid
- Application of Bipolar Coordinates to the Two-Dimensional Creeping Motion of a Liquid. : I. Flow over a Projection or a Depression on a Wall
- On the Exact Solution of the Stokes Equations for a Torus
- Viscosity of Suspension for Doublets of Two Equal-Sized Spheres
- Application of Bipolar Coordinates to the Two-dimensional Creeping Motion of a Liquid. : II. Some Problems for Two Circular Cylinders in Viscous Fluid
- Application of Bipolar Coordinates to the Two-Dimensional Creeping Motion of a Liquid.III.Separation in Stokes Flows
- Viscous Flows past a Spheroid
- Mutual Interaction of Two Spheroids Sedimenting in a Viscous Fluid
- Slow Motions of a Viscous Fluid around Two Spheres