NONSMOOTH MODEL FOR PLASTIC LIMIT ANALYSIS AND ITS SMOOTHING ALGORITHM

By means of Lagrange duality of Hill＇s maximum plastic work principle theory of the convex program, a dual problem under Mises＇ yield condition has been derived and whereby a non-differentiable convex optimization model for the limit analysis is developed. With this model, it is not necessary to lin...

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Vydáno v:	Applied mathematics and mechanics Ročník 27; číslo 8; s. 1081 - 1088
Hlavní autor:	李建宇潘少华李兴斯
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	State Key Laboratory of Structural Analysis for Industrial Equipment,Dalian University of Technology,Dalian 116023,P.R.China%Department of Applied Mathematics,South China University of Technology,Guangzhou 510641,P.R.China 01.08.2006
Témata:	Algorithms Continuums Limit load Mathematical models Norms Optimization Smoothing Strain 塑料有限分析对偶性平滑法非光滑优化 duality nonsmooth optimization plastic limit analysis smoothing method
ISSN:	0253-4827, 1573-2754
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Popis
Shrnutí:	By means of Lagrange duality of Hill＇s maximum plastic work principle theory of the convex program, a dual problem under Mises＇ yield condition has been derived and whereby a non-differentiable convex optimization model for the limit analysis is developed. With this model, it is not necessary to linearize the yield condition and its discrete form becomes a minimization problem of the sum of Euclidean norms subject to linear constraints. Aimed at resolving the non-differentiability of Euclidean norms, a smoothing algorithm for the limit analysis of perfect-plastic continuum media is proposed. Its efficiency is demonstrated by computing the limit load factor and the collapse state for some plane stress and plain strain problems.
Bibliografie:	O221.2 plastic limit analysis plastic limit analysis; duality; nonsmooth optimization; smoothing method 31-1650/O1 duality nonsmooth optimization O344.5 smoothing method ObjectType-Article-2 SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 23
ISSN:	0253-4827 1573-2754
DOI:	10.1007/s10483-006-0808-z