DocumentCode
405993
Title
Nonlinear waves in approximately constrained materials
Author
Pastrone, F. ; Tonon, M.L.
Author_Institution
Dipt. di Matematica, Torino Univ., Italy
fYear
2003
fDate
24-27 June 2003
Firstpage
162
Lastpage
174
Abstract
In this paper, we give a general treatment of the propagation of nonlinear acceleration waves in approximately constrained elastic materials. By means of a suitable perturbative scheme, namely a Laurent expansion for the constitutive functions, we can derive the characteristic of acceleration waves, speeds and amplitudes, for elastic bodies with first and second-order poles. The theory is applied to St. Venant-Kirchhoff materials, which can be used to approximate rigid or incompressible bodies, to isotropic, anisotropic materials and to a model for unidirectionally fiber-reinforced composites.
Keywords
anisotropic media; elastic waves; fibre reinforced composites; wave propagation; Laurent expansion; St. Venant-Kirchhoff materials; acceleration waves; constitutive function; constrained elastic materials; nonlinear propagation; second-order poles; Acceleration; Anisotropic magnetoresistance; Composite materials; Constraint theory; Nonlinear equations; Optical fiber theory; Tensile stress; Tiles;
fLanguage
English
Publisher
ieee
Conference_Titel
Day on Diffraction, 2003. Proceedings. International Seminar
Conference_Location
Saint Petersburg, Russia
Print_ISBN
5-94158-070-3
Type
conf
DOI
10.1109/DD.2003.238229
Filename
1278248
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