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Global existence for three-dimensional incompressible isotropic elastodynamics via the incompressible limit

✍ Scribed by Thomas C. Sideris; Becca Thomases

Publisher
John Wiley and Sons
Year
2005
Tongue
English
Weight
277 KB
Volume
58
Category
Article
ISSN
0010-3640

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✦ Synopsis

Abstract

The existence of global‐in‐time classical solutions to the Cauchy problem for incompressible nonlinear isotropic elastodynamics for small initial displacements is proved. Solutions are constructed via approximation by slightly compressible materials. The energy for the approximate solutions remains uniformly bounded on a time scale that goes to infinity as the material approaches incompressibility. A necessary component to the long‐time existence of the approximating solution is a null or linear degeneracy condition, inherent in the isotropic case, which limits the quadratic interaction of the shear waves. The proof combines energy and decay estimates based on commuting vector fields and a compactness argument. © 2004 Wiley Periodicals, Inc.

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