Time Reversed Elastic Waves within Soft Solids

Stefan Catheline; Carlos Negreira; Nicolas Benech; Javier Brum

doi:10.1121/1.2934202

Time Reversed Elastic Waves within Soft Solids

The Journal of the Acoustical Society of America ◽

10.1121/1.2934202 ◽

2008 ◽

Vol 123 (5) ◽

pp. 3430-3430

Author(s):

Stefan Catheline ◽

Carlos Negreira ◽

Nicolas Benech ◽

Javier Brum

Keyword(s):

Elastic Waves ◽

Soft Solids

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Nonlinear elastic waves in architected soft solids

The Journal of the Acoustical Society of America ◽

10.1121/1.4988205 ◽

2017 ◽

Vol 141 (5) ◽

pp. 3735-3735

Author(s):

Bolei Deng ◽

Jordan R. Raney ◽

Katia Bertoldi ◽

Vincent Tournat

Keyword(s):

Elastic Waves ◽

Soft Solids ◽

Nonlinear Elastic

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Time Reversal of Elastic Waves in Soft Solids

Physical Review Letters ◽

10.1103/physrevlett.100.064301 ◽

2008 ◽

Vol 100 (6) ◽

Cited By ~ 43

Author(s):

S. Catheline ◽

N. Benech ◽

J. Brum ◽

C. Negreira

Keyword(s):

Time Reversal ◽

Elastic Waves ◽

Soft Solids

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Elastic Waves Generated by Laser Induced Bubbles in Soft Solids

Proceedings of the 10th International Symposium on Cavitation (CAV2018) ◽

10.1115/1.861851_ch68 ◽

2018 ◽

pp. 352-356

Keyword(s):

Elastic Waves ◽

Soft Solids

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Remarks on nonlinear elastic waves with null conditions

ESAIM Control Optimisation and Calculus of Variations ◽

10.1051/cocv/2020039 ◽

2020 ◽

Vol 26 ◽

pp. 121

Author(s):

Dongbing Zha ◽

Weimin Peng

Keyword(s):

Initial Data ◽

Global Existence ◽

Elastic Waves ◽

Wave Equations ◽

Alternative Proof ◽

Classical Solutions ◽

Small Initial Data ◽

Hyperelastic Materials ◽

Variational Structure ◽

Nonlinear Elastic

For the Cauchy problem of nonlinear elastic wave equations for 3D isotropic, homogeneous and hyperelastic materials with null conditions, global existence of classical solutions with small initial data was proved in R. Agemi (Invent. Math. 142 (2000) 225–250) and T. C. Sideris (Ann. Math. 151 (2000) 849–874) independently. In this paper, we will give some remarks and an alternative proof for it. First, we give the explicit variational structure of nonlinear elastic waves. Thus we can identify whether materials satisfy the null condition by checking the stored energy function directly. Furthermore, by some careful analyses on the nonlinear structure, we show that the Helmholtz projection, which is usually considered to be ill-suited for nonlinear analysis, can be in fact used to show the global existence result. We also improve the amount of Sobolev regularity of initial data, which seems optimal in the framework of classical solutions.

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