Abstract
The stability of viscous shear is studied for flows that
consist of predominantly linear
shear, but contain localized regions over which the vorticity varies rapidly.
Matched
asymptotic expansion simplifies the governing equations for the dynamics
of such
‘vorticity defects’. The normal modes satisfy explicit
dispersion relations. Nyquist
methods are used to find and classify the possible instabilities. The defect
equations
are analysed in the inviscid limit to establish the connection with inviscid
theory.
Finally, the defect approximation is used to study nonlinear stability
using weakly
nonlinear techniques, and the initial value problem using Laplace transforms.
Publisher
Cambridge University Press (CUP)
Subject
Mechanical Engineering,Mechanics of Materials,Condensed Matter Physics
Cited by
7 articles.
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