Limit load and shakedown analysis of plastic structures under stochastic uncertainty

Problems from plastic analysis are based on the convex, linear or linearised yield/strength condition and the linear equilibrium equation for the stress (state) vector. In practice one has to take into account stochastic variations of several model parameters. Hence, in order to get robust maximum l...

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Bibliographic Details
Published in:Computer methods in applied mechanics and engineering 2008-11, Vol.198 (1), p.42-51
Main Author: Marti, K.
Format: Article
Language:English
Subjects:
Quadratic loss functions
Robust maximum load factors
Stochastic nonlinear programming
Structural analysis under stochastic uncertainty
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Summary:Problems from plastic analysis are based on the convex, linear or linearised yield/strength condition and the linear equilibrium equation for the stress (state) vector. In practice one has to take into account stochastic variations of several model parameters. Hence, in order to get robust maximum load factors, the structural analysis problem with random parameters must be replaced by an appropriate deterministic substitute problem. A direct approach is proposed based on the primary costs for missing carrying capacity and the recourse costs (e.g. costs for repair, compensation for weakness within the structure, damage, failure, etc.). Based on the mechanical survival conditions of plasticity theory, a quadratic error/loss criterion is developed. The minimum recourse costs can be determined then by solving an optimisation problem having a quadratic objective function and linear constraints. For each vector a ( · ) of model parameters and each design vector x, one obtains then an explicit representation of the “best” internal load distribution F ∗ . Moreover, also the expected recourse costs can be determined explicitly. Consequently, an explicit stochastic nonlinear program results for finding a robust maximal load factor μ ∗ . The analytical properties and possible solution procedures are discussed.
ISSN:0045-7825
1879-2138
DOI:10.1016/j.cma.2008.04.022