The neutral curves for periodic perturbations of finite amplitude of plane Poiseuille flow

C. L. Pekeris; B. Shkoller

doi:10.1017/S0022112069002370

Abstract

It is shown that there exist undamped solutions for perturbations of finite amplitude of plane Poiseuille flow, which are periodic in the direction of the axis of the channel. The shift in the ‘neutral curve’ as a function of the amplitude λ* of the disturbance is shown in figure 2. The solution is obtained by a perturbation method in which the eigenfunctions and the eigenvalue c are expanded in power series of the amplitude λ, as shown in (14), (15), (16) and (17). Near the neutral curve for a finite amplitude disturbance, the curvature of the mean flow shows a tendency to become negative (figure 5).

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The neutral curves for periodic perturbations of finite amplitude of plane Poiseuille flow

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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The neutral curves for periodic perturbations of finite amplitude of plane Poiseuille flow

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