@article {Criminale:1991:0022-2526:249,
title = "General ThreeDimensional Disturbances to Inviscid Couette Flow",
journal = "Studies in Applied Mathematics",
parent_itemid = "infobike://bpl/sapm",
publishercode ="bp",
year = "1991",
volume = "85",
number = "3",
publication date ="1991-10-01T00:00:00",
pages = "249-267",
itemtype = "ARTICLE",
issn = "0022-2526",
eissn = "1467-9590",
url = "https://www.ingentaconnect.com/content/bpl/sapm/1991/00000085/00000003/art00004",
doi = "doi:10.1002/sapm1991853249",
author = "Criminale, W. O. and Long, Bruce and Zhu, Mei",
abstract = "The general solution to the linearized equations governing threedimensional disturbances to inviscid Couette flow has been obtained. This result extends the Orr solution to initial conditions that do not consist of a single Fourier sine component in the crossstream coordinate
and a plane wave in the streamwise/spanwise coordinates. The time evolution of a measure of disturbance energy for some specific pulsed initial conditions is examined, and it is concluded that, while the rapid algebraic growth to large amplitude followed by decay exemplified by the Orr solution
can be of importance for individual crossstream Fourier components, more realistic initial conditions, which in general consist of the sum of an infinite number of components, often display uniform decay to zero amplitude. However, an interesting example is described in which one positive
definite measure of disturbance amplitude remains constant, yet the streamwise/spanwise velocity components grow linearly in time if the initial disturbance is threedimensional.",
}