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Revista Colombiana de Matemáticas
versão impressa ISSN 0034-7426
Resumo
EREMEYEV, VICTOR A.; LEBEDEV, LEONID P. e RENDON, LEONARDO. On the propagation of acceleration waves in thermoelastic micropolar medias. Rev.colomb.mat. [online]. 2007, vol.41, n.2, pp.397-406. ISSN 0034-7426.
The conditions for propagation of accelerating waves in a general nonlinear thermoelastic micropolar media are established. Deformation of micropolar media is described by the time-varying displacement vector r(t) and tensor of microrotation r(t) at each point. We call a surface S(t) an accelerating wave (or a singular surface for a solution of the dynamic problem for the medium) if the points are points of continuity of both r(t) and H(t) and their first spatial and time derivatives while the second spatial and time derivatives (acceleration) of r(t) and H(t) have jumps on S(t) (meaning that their one-sided limits at S(t) differ). So S(t) carries jumps in the acceleration fields as it propagat es through the body. In the thermomechanics of a micropolar continuum, similar propagating surfaces of singularities can exist for the fields of temperature, heat flux, etc. We establish the kinematic and dynamic compatibility relations for the singular surface S(t) in a nonlinear micropolar thermoelastic medium. An analog of Fresnel--Hadamard--Duhem theorem and an expression for the acoustic tensor are derived.
Palavras-chave : Acceleration waves; micropolar continuum; Cosserat continuum; nonlinear elasticity.