Abstract
Progressive harmonic waves in nonlinear elastic materials are generally considered as small disturbances superposed on a finite deformation. In this first approximation they are governed by essentially the same laws as in linear elasticity. In the present paper a second-order theory is developed which allows for nonlinear effects on progressive waves in a finitely deformed elastic material. The problem is investigated by means of a perturbation procedure using intrinsically two time scales. After providing the kinematical prerequisites a transport equation is derived which governs the distortion of the wave profile. A closedform solution is obtained for the case of a plane wave in a homogeneous medium. The influence of nonlinearity is closely related to the evolution of acceleration waves.
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