Small-amplitude viscous motion on arbitrary potential flows
Abstract
This paper is concerned with small-amplitude, unsteady, vortical and entropic motion imposed on steady potential flows. It is restricted to the case where the spatial scale of the unsteady motion is small compared to that of the mean flow. Under such conditions, the unsteady motion may be influenced by viscosity even if the mean flow is not. An exact high-frequency (small-wavelength) solution is obtained for the small-amplitude viscous motion imposed on a steady potential flow. It generalizes the one obtained by Pearson (1959) for the homogeneous-strain case to the case of quasi-homogeneous strain. This result is used to study the effect of viscosity on rapidly distorted turbulent flows. Specific numerical results are given for a turbulent flow near a two-dimensional stagnation point.
- Publication:
-
Quarterly Journal of Mechanics and Applied Mathematics
- Pub Date:
- February 1984
- Bibcode:
- 1984QJMAM..37....1G
- Keywords:
-
- Potential Flow;
- Small Perturbation Flow;
- Steady Flow;
- Turbulent Flow;
- Viscous Flow;
- Flow Distortion;
- Flow Theory;
- Incompressible Flow;
- Poisson Equation;
- Stagnation Point;
- Unsteady Flow;
- Fluid Mechanics and Heat Transfer