Spectral Stability of Noncharacteristic Isentropic Navier–Stokes Boundary Layers

Building on the work of Barker, Humpherys, Lafitte, Rudd, and Zumbrun in the shock wave case, we study stability of compressive, or shock-like , boundary layers of the isentropic compressible Navier–Stokes equations with γ -law pressure by a combination of asymptotic ODE estimates and numerical Evan...

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Bibliographic Details
Published in:Archive for rational mechanics and analysis 2009-06, Vol.192 (3), p.537-587
Main Authors: Costanzino, Nicola, Humpherys, Jeffrey, Nguyen, Toan, Zumbrun, Kevin
Format: Article
Language:English
Subjects:
Aerodynamics
Classical Mechanics
Complex Systems
Fluid- and Aerodynamics
Mathematical and Computational Physics
Physics
Physics and Astronomy
Studies
Theoretical
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Summary:Building on the work of Barker, Humpherys, Lafitte, Rudd, and Zumbrun in the shock wave case, we study stability of compressive, or shock-like , boundary layers of the isentropic compressible Navier–Stokes equations with γ -law pressure by a combination of asymptotic ODE estimates and numerical Evans function computations. Our analytical results include convergence of the Evans function in the shock and large-amplitude limits and stability in the large-amplitude limit, the first rigorous stability result for other than the nearly constant case, for all . Together with these analytical results, our numerical investigations indicate stability for γ ϵ [1, 3] for all compressive boundary-layers, independent of amplitude, save for inflow layers in the characteristic limit (not treated). Expansive inflow boundary-layers have been shown to be stable for all amplitudes by Matsumura and Nishihara using energy estimates. Besides the parameter of amplitude appearing in the shock case, the boundary-layer case features an additional parameter measuring displacement of the background profile, which greatly complicates the resulting case structure. Inflow boundary layers turn out to have quite delicate stability in both large-displacement ( shock ) and large-amplitude limits, necessitating the additional use of a mod-two stability index studied earlier by Serre and Zumbrun in order to decide stability.
ISSN:0003-9527
1432-0673
DOI:10.1007/s00205-008-0153-1