Title of article
Numerical analyses of discontinuous material bifurcation: strong and weak discontinuities Original Research Article
Author/Authors
J. Mosler، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
22
From page
979
To page
1000
Abstract
In this paper an algorithmic formulation for numerical analyses of material bifurcation is presented. Conditions for the onset of both weak discontinuities (discontinuous strain rates) and strong discontinuities (discontinuous velocity fields) are summarized. Based on a recently proposed plasticity model formulated within the logarithmic strain space, the condition for the formation of strong discontinuities is extended to anisotropic finite strain plasticity theory. The resulting equations associated with the mode of bifurcation are solved numerically. For that purpose, an equivalent optimization problem is considered. The algorithmic formulation is based on Newton’s method using a consistent linearization. To enlarge the radius of convergence, a line search strategy is applied. The applicability of the proposed implementation as well as its performance and numerical robustness is investigated by means of three-dimensional numerical bifurcation analyses of a Drucker–Prager type plasticity model.
Keywords
Weak discontinuities , Singular surfaces , Material bifurcation , Strong discontinuities , localization
Journal title
Computer Methods in Applied Mechanics and Engineering
Serial Year
2005
Journal title
Computer Methods in Applied Mechanics and Engineering
Record number
893205
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