Title of article
A quasi-static stability analysis for Biotʹs equation and standard dissipative systems
Author/Authors
Abed-Meraim، نويسنده , , Farid and Nguyen، نويسنده , , Quoc-Son، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2007
Pages
11
From page
383
To page
393
Abstract
In this paper, an extended version of Biotʹs differential equation is considered in order to discuss the quasi-static stability of a response for a solid in the framework of generalized standard materials. The same equation also holds for gradient theories since the gradients of arbitrary order of the state variables and of their rates can be introduced in the expression of the energy and of the dissipation potentials. The stability of a quasi-static response of a system governed by Biotʹs equations is discussed. Two approaches are considered, by direct estimates and by linearizations. The approach by direct estimates can be applied in visco-plasticity as well as in plasticity. A sufficient condition of stability is proposed and based upon the positivity of the second variation of energy along the considered response. This is an extension of the criterion of second variation, well known in elastic buckling, into the study of the stability of a response. The linearization approach is available only for smooth dissipation potentials, i.e. for the study of visco-elastic solids and leads to a result on asymptotic stability. The paper is illustrated by a simple example.
Keywords
Local and non-local descriptions , Biotיs equation , Generalized standard models , plasticity , Stability of a quasi-static response , Visco-plasticity , Second variation criterion
Journal title
European Journal of Mechanics: A Solids
Serial Year
2007
Journal title
European Journal of Mechanics: A Solids
Record number
1388953
Link To Document