English

A necessary and sufficient instability condition for inviscid shear flow

Fluid Dynamics 2016-09-08 v1

Abstract

The linear stability of inviscid, incompressible, two-dimensional, plane parallel, shear flow was considered over a century ago by Rayleigh, Kelvin, and others. A principal result on the subject is Rayleigh's celebrated inflection point theorem {R80}, which states that for an equilibrium flow to be unstable, the equilibrium velocity profile must contain an inflection point. That is, if the velocity profile is given by U(y)U(y), where yy is the cross-stream coordinate, then there must be a point, y=yIy=y_I, for which U(yI)=0U''(y_I)=0. Much later, in 1950, Fj{\o}rtoft {F50} generalized the theorem by showing that, moreover, if there is one inflection point, then U(yI)/U(yI)<0U'''(y_I)/U'(y_I)<0 is required for instability (see {Bar} for further extensions). Both Rayleigh's Theorem and Fj{\o}rtoft's subsequent generalization are necessary conditions for instability, but they are not sufficient. That is, even though an equilibrium profile may contain a vorticity minimum, it is not necessarily unstable. The point of this paper is to derive, for a large class of equilibrium velocity profiles, a condition that is necessary and sufficient for instability.

Keywords

Cite

@article{arxiv.physics/9809024,
  title  = {A necessary and sufficient instability condition for inviscid shear flow},
  author = {N. J. Balmforth and P. J. Morrison},
  journal= {arXiv preprint arXiv:physics/9809024},
  year   = {2016}
}

Comments

Latex, 28 pages, 9 figures. Accepted by Studies in Applied Mathematics