On the mathematical and geometrical structure of the determining equations for shear waves in nonlinear isotropic incompressible elastodynamics
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Publication:3189902
DOI10.1063/1.4891602zbMath1366.74031arXiv1408.6177OpenAlexW3105352614WikidataQ57555687 ScholiaQ57555687MaRDI QIDQ3189902
Giuseppe Saccomandi, Raffaele Vitolo
Publication date: 12 September 2014
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1408.6177
Related Items (13)
On essential nonlinearities emerging from linear systems ⋮ Plane-polarised finite-amplitude shear waves in deformed incompressible materials ⋮ Bogus transformations in mechanics of continua ⋮ Systems of conservation laws with third-order Hamiltonian structures ⋮ On unphysical terms in the elastic Hertz potentials ⋮ Shear shock evolution in incompressible soft solids ⋮ Helmholtz-type solitary wave solutions in nonlinear elastodynamics ⋮ Nonlinear elastodynamics of materials with strong ellipticity condition: Carroll-type solutions ⋮ Two-dimensional nonlinear stress and displacement waves for a new class of constitutive equations ⋮ Waves in isotropic dispersive elastic solids ⋮ Compact structures as true non-linear phenomena ⋮ Ut vis sic tensio ⋮ On the propagation of nonlinear SH waves in a two-layered compressible elastic medium
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