Title of article
A GENERALIZED VARIABLE FORMULATION FOR GRADIENT DEPENDENT SOFTENING PLASTICITY
Author/Authors
C. Comi، نويسنده , , U. Perego، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1996
Pages
25
From page
3731
To page
3755
Abstract
A mesh-independent finite element method for elastoplastic problems with softening is proposed. The
regularization of the boundary value problem is achieved introducing in the yield function the second order
gradient of the plastic multiplier. The backward-difference integrated finite-step problem enriched with the
gradient term is given a variational formulation where the consitutive equations are treated in weak form as
well as the other field equations. A predictor-corrector scheme is proposed for the solution of the non-linear
algebraic problem resulting from the finite element discretization of the functional. The expression of the
consistent tangent matrix is provided and the corrector phase is formulated as a Linear Complementarity
Problem. The effectiveness of the proposed methodology is verified by one- and two-dimensional tests
Keywords
generalized variables , localization , Gradient plasticity , Softening , Finite elements
Journal title
International Journal for Numerical Methods in Engineering
Serial Year
1996
Journal title
International Journal for Numerical Methods in Engineering
Record number
423224
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