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- Title
Scattering and rigidity for nonlinear elastic waves.
- Authors
Zha, Dongbing
- Abstract
For the Cauchy problem of nonlinear elastic wave equations of three-dimensional isotropic, homogeneous and hyperelastic materials satisfying the null condition, global existence of classical solutions with small initial data was proved in Agemi (Invent Math 142:225–250, 2000) and Sideris (Ann Math 151:849–874, 2000), independently. In this paper, we will consider the asymptotic behavior of global solutions. We first show that the global solution will scatter, i.e., it will converge to some solution of linear elastic wave equations as time tends to infinity, in the energy sense. We also prove the following rigidity result: if the scattering data vanish, then the global solution will also vanish identically. The variational structure of the system will play a key role in our argument.
- Subjects
CLASSICAL solutions (Mathematics); ELASTIC waves; NONLINEAR waves; NONLINEAR wave equations; CAUCHY problem; WAVE equation
- Publication
Calculus of Variations & Partial Differential Equations, 2024, Vol 63, Issue 5, p1
- ISSN
0944-2669
- Publication type
Article
- DOI
10.1007/s00526-024-02736-2