The evolution of linearized perturbations of parallel flows
Technical Report
·
OSTI ID:5019467
The equations of an incompressible fluid are linearized for small perturbations of a basic parallel flow. The initial-value problem is then posed by use of Fourier transforms in space. Previous results are systematized in a general framework and used to solve a series of problems for prototypical examples of basic shear and of initial disturbance. The prototypes of shear flow are plane Couette flow bounded by rigid parallel walls, plane Couette flow bounded by rigid walls at constant pressure, unbounded two-layer flow with linear velocity profile in each layer, a piecewise linear profile of a boundary layer on a rigid wall. The prototypes of initial perturbation are the fundamental ones: point source of the field of the transverse velocity (represented by delta functions), an unbounded sinusoidal field of the transverse velocity, a point source of the lateral component of vorticity, a sinusoidal field of the lateral vorticity. Detailed solutions for an inviscid fluid are presented, but the problem for a viscous fluid is only broached. 19 refs., 3 figs.
- Research Organization:
- Washington Univ., Seattle, WA (USA). Dept. of Applied Mathematics
- Sponsoring Organization:
- DOE/ER
- DOE Contract Number:
- FG06-88ER25061
- OSTI ID:
- 5019467
- Report Number(s):
- DOE/ER/25061-3; ON: DE90005978
- Country of Publication:
- United States
- Language:
- English
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Related Subjects
640410* -- Fluid Physics-- General Fluid Dynamics
75 CONDENSED MATTER PHYSICS
SUPERCONDUCTIVITY AND SUPERFLUIDITY
BOUNDARY LAYERS
COUETTE FLOW
DIFFERENTIAL EQUATIONS
DISTURBANCES
EQUATIONS
EQUATIONS OF MOTION
FLUID FLOW
INCOMPRESSIBLE FLOW
LAMINAR FLOW
LAYERS
PARTIAL DIFFERENTIAL EQUATIONS
VISCOUS FLOW
75 CONDENSED MATTER PHYSICS
SUPERCONDUCTIVITY AND SUPERFLUIDITY
BOUNDARY LAYERS
COUETTE FLOW
DIFFERENTIAL EQUATIONS
DISTURBANCES
EQUATIONS
EQUATIONS OF MOTION
FLUID FLOW
INCOMPRESSIBLE FLOW
LAMINAR FLOW
LAYERS
PARTIAL DIFFERENTIAL EQUATIONS
VISCOUS FLOW