Quasistatic evolution problems for linearly elastic - perfectly plastic materials

The problem of quasistatic evolution in small strain associative elastoplasticity is studied in the framework of the variational theory for rate-independent processes. Existence of solutions is proved through the use of incremental variational problems in spaces of functions with bounded deformation. This provides a new approximation result for the solutions of the quasistatic evolution problem, which are shown to be absolutely continuous in time. Four equivalent formulations of the problem in rate form are derived. A strong formulation of the flow rule is obtained by introducing a precise definition of the stress on the singular set of the plastic strain.

Titolo: Quasistatic evolution problems for linearly elastic - perfectly plastic materials
Autori: 
MORA, MARIA GIOVANNA
mostra contributor esterni 
Data di pubblicazione: 2006
Rivista: 
ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS  
Abstract: The problem of quasistatic evolution in small strain associative elastoplasticity is studied in the framework of the variational theory for rate-independent processes. Existence of solutions is proved through the use of incremental variational problems in spaces of functions with bounded deformation. This provides a new approximation result for the solutions of the quasistatic evolution problem, which are shown to be absolutely continuous in time. Four equivalent formulations of the problem in rate form are derived. A strong formulation of the flow rule is obtained by introducing a precise definition of the stress on the singular set of the plastic strain.
Handle: http://hdl.handle.net/11571/363555
Appare nelle tipologie:1.1 Articolo in rivista

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http://hdl.handle.net/11571/363555
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