One-dimensional motion of a material with a strain theshold

• Main Authors: A. Farina, A. Fasano, L. Fusi, K.R. Rajagopal
• Format: Article
• Language: English
• Published: Università degli Studi di Catania 2007-12-01
• Series: Le Matematiche
• Subjects: Implicit constitutive theories; Free boundary problems; Wave equation
• Online Access: http://www.dmi.unict.it/ojs/index.php/lematematiche/article/view/36

We consider the one-dimensional shearing motion of a material exhibiting elastic behaviour when the stress is below some threshold. The threshold represents a limit to the deformability, i.e. no further deformation can occur on increasing the stress. The mathematical formulation leads to a free boundary problem for the wave equation, whose structure depends on whether the stress (and the velocity) are continuous across the propagating interface for the strain threshold .<br />Local existence and uniqueness are proved for the continuous case (in which the interface propagation is subsonic). Some explicit solutions are calculated for another case (with a supersonic interface). It is shown that the model with strain threshold is never the limit of hyperelastic systems.