Title of article
A nonsmooth Newton method for elastoplastic problems Original Research Article
Author/Authors
Peter W. Christensen، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2002
Pages
31
From page
1189
To page
1219
Abstract
In this work we reformulate the incremental, small strain, J2-plasticity problem with linear kinematic and nonlinear isotropic hardening as a set of unconstrained, nonsmooth equations. The reformulation is done using the minimum function. The system of equations obtained is piecewise smooth which enables Pangʹs Newton method for B-differentiable equations to be used. The method proposed in this work is compared with the familiar radial return method. It is shown, for linear kinematic and isotropic hardening, that this method represents a piecewise smooth mapping as well. Thus, nonsmooth Newton methods with proven global convergence properties are applicable. In addition, local quadratic convergence (even to nondifferentiable points) of the standard implementation of the radial return method is established. Numerical tests indicate that our method is as efficient as the radial return method, albeit more sensitive to parameter changes.
Keywords
Elastoplasticity , Newton method , Piecewise smooth equations , Radial return
Journal title
Computer Methods in Applied Mechanics and Engineering
Serial Year
2002
Journal title
Computer Methods in Applied Mechanics and Engineering
Record number
892460
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