On the stability of plane Couette flow to infinitesimal disturbances

Davey, A.

doi:10.1017/s0022112073001217

Cited by 39 publications

(31 citation statements)

References 14 publications

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“…Evidently, the three-dimensional disturbances quickly achieve a form that grows exponentially in time for R < 1000. The growth rate of the threedimensional disturbances is rapid with their amplitude increasing by a factor of about 10 in a Here E 2D is the total energy (relative to the laminar flow) in wave numbers of the form (na 9 0) 9 while E 3D is the total energy in wave numbers (na f (3). For R £ 1000 we obtain growth and for R = 500 decay.…”

mentioning

confidence: 80%

“…A similar problem was studied in Ref. 3, where profile steepening because of cavity formation could be predicted. However, the calculations were based on the driven nonlinear Schrodinger equation ignoring ion inertia.…”

mentioning

confidence: 81%

“…While experiments 1 show that incompressible plane Poiseuille and plane couette flow may undergo transition to turbulence at Reynolds numbers R of order 1000, linear stability analysis of these plane parallel flows gives critical Reynolds numbers of 5772 for plane Poiseuille flow 2 and «>for plane couette flow. 3 This discrepancy between theory and experiment suggests that the +1 mechanism of transition is not properly represented by parallel-flow linear stability analysis. In this Letter, we present a new linear threedimensional mechanism that predicts transition at Reynolds numbers in good agreement with experiment for both plane Poiseuille and plane couette flows.…”

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confidence: 99%

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Subcritical Transition to Turbulence in Plane Channel Flows

1980

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Subcritical Transition to Turbulence in Plane Channel Flows

1980

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“…Numerical studies of the linear stability problem have been carried out by Grohne (1954), Gallagher andMercer (1962, 1964), Deardorff (1963), Davey (1973), and Gallagher (1974); however, all these studies found no evidence of instability. A number of analytic studies have also been carried out on this problem.…”

Section: Introductionmentioning

confidence: 99%

On the linear stability of compressible plane Couette flow

1994

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91-11267 ABSTRACTThe linear stability of compressible plane Couette flow is investigated. The correct and proper basic velocity and temperature distributions are perturbed by a small amplitude normal mode disturbance. The full small amplitude disturbance equations are solved numerically at finite Reynolds numbers, and the inviscid limit of these equations is then investigated in sene detail. It is found that instability can occur, although the stability characteristics of the flow are quite different from unbounded flows. The effects of viscosity are also calculated, asymptotically, and shown to have a stabilizing role in all the cases investigated. Exceptional regimes to the problem occur when the wavespeed of the disturbances approaches the velocity of either of the walls, and these regimes are also analyzed in some detail. Finally, the effect of imposing radiation-type boundary conditions on the upper (moving) wall (in place of impermeability) is investigated, and shown to yield results common to both bounded and unbounded flows.

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“…However, at large Reynolds number these modes fall into two classes. There are relatively slowly decaying modes concentrated in boundary layers next to the walls (Davey 1973) and there are rapidly decaying modes with oscillatory structure in the centre of the channel (Schmid et al 1992). The boundary modes are exponentially small in the main body of the flow, whereas the central modes are not localized within the defect region.…”

Section: The Viscous Problemmentioning

confidence: 99%

Dynamics of vorticity defects in shear

1997

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Matched asymptotic expansions are used to obtain a reduced description of the nonlinear and viscous evolution of small, localized vorticity defects embedded in a Couette flow. This vorticity defect approximation is similar to the Vlasov equation, and to other reduced descriptions used to study forced Rossby wave critical layers and their secondary instabilities. The linear stability theory of the vorticity defect approximation is developed in a concise and complete form. The dispersion relations for the normal modes of both inviscid and viscous defects are obtained explicitly. The Nyquist method is used to obtain necessary and sufficient conditions for instability, and to understand qualitatively how changes in the basic state alter the stability properties. The linear initial value problem is solved explicitly with Laplace transforms; the resulting solutions exhibit the transient growth and eventual decay of the streamfunction associated with the continuous spectrum. The expansion scheme can be generalized to handle vorticity defects in non-Couette, but monotonic, velocity profiles.

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On the stability of plane Couette flow to infinitesimal disturbances

Cited by 39 publications

References 14 publications

Subcritical Transition to Turbulence in Plane Channel Flows

Subcritical Transition to Turbulence in Plane Channel Flows

On the linear stability of compressible plane Couette flow

Dynamics of vorticity defects in shear

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