Ebook Info
- Published:
- Number of pages: 167 pages
- Format: PDF
- File Size: 1.16 MB
- Authors: Tai-Ping Liu
Description
The authors study the perturbation of a shock wave in conservation laws with physical viscosity. They obtain the detailed pointwise estimates of the solutions. In particular, they show that the solution converges to a translated shock profile. The strength of the perturbation and that of the shock are assumed to be small but independent. The authors’ assumptions on the viscosity matrix are general so that their results apply to the Navier-Stokes equations for the compressible fluid and the full system of magnetohydrodynamics, including the cases of multiple eigenvalues in the transversal fields, as long as the shock is classical. The authors’ analysis depends on accurate construction of an approximate Green’s function. The form of the ansatz for the perturbation is carefully constructed and is sufficiently tight so that the author can close the nonlinear term through Duhamel’s principle.
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Free Download Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015) in PDF format
Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015) PDF Free Download
Download Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015) PDF Free
Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015) PDF Free Download
Download Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015) PDF
Free Download Ebook Shock Waves in Conservation Laws With Physical Viscosity (Memoirs of the American Mathematical Society, March 2015)
