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June 2003 Singularity Formation and Instability in the Unsteady Inviscid and Viscous Prandtl Equations
Lan Hong, John K. Hunter
Commun. Math. Sci. 1(2): 293-316 (June 2003).

Abstract

We use the method of characteristics to prove the short-time existence of smooth solutions of the unsteady inviscid Prandtl equations, and present a simple explicit solution that forms a singularity in finite time. We give numerical and asymptotic solutions which indicate that this singularity persists for nonmonotone solutions of the viscous Prandtl equations. We also solve the linearization of the inviscid Prandtl equation about shear flow. We show that the resulting problem is weakly, but not strongly, well-posed, and that it has an unstable continuous spectrum when the shear flow has a critical point, in contrast with the behavior of the linearized Euler equations.

Citation

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Lan Hong. John K. Hunter. "Singularity Formation and Instability in the Unsteady Inviscid and Viscous Prandtl Equations." Commun. Math. Sci. 1 (2) 293 - 316, June 2003.

Information

Published: June 2003
First available in Project Euclid: 7 June 2005

zbMATH: 1084.76020
MathSciNet: MR1980477

Rights: Copyright © 2003 International Press of Boston

Vol.1 • No. 2 • June 2003
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