Journal article
Extension of the a posteriori finite element method (APFEM) to geometrical alterations and application to stochastic homogenisation
- Abstract:
- We recently proposed an efficient method facilitating the parametric study of a finite element mechanical simulation as a postprocessing step, that is, without the need to run multiple simulations: the a posteriori finite element method (APFEM). APFEM only requires the knowledge of the vertices of the parameter space and is able to predict accurately how the degrees of freedom of a simulation, i.e., nodal displacements, and other outputs of interests, for example, element stress tensors, evolve when simulation parameters vary within their predefined ranges. In our previous work, these parameters were restricted to material properties and loading conditions. Here, we extend the APFEM to additionally account for changes in the original geometry. This is achieved by defining an intermediary reference frame whose mapping is defined stochastically in the weak form. Subsequent deformation is then reached by correcting for this stochastic variation in the reference frame through multiplicative decomposition of the deformation gradient tensor. The resulting framework is shown here to provide accurate mechanical predictions for relevant applications of increasing complexity: (i) quantifying the stress concentration factor of a plate under uniaxial loading with one and two elliptical holes of varying eccentricities, and (ii) performing the stochastic homogenisation of a composite plate with uncertain mechanical properties and geometry inclusion. This extension of APFEM completes our original approach to account parametrically for geometrical alterations, in addition to boundary conditions and material properties. The advantages of this approach in our original work in terms of stochastic prediction, uncertainty quantification, structural and material optimisation and Bayesian inferences are all naturally conserved.
- Publication status:
- Published
- Peer review status:
- Peer reviewed
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(Preview, Version of record, pdf, 3.0MB, Terms of use)
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- Publisher copy:
- 10.1002/nme.7482
Authors
+ Engineering and Physical Sciences Research Council
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- Funder identifier:
- https://ror.org/0439y7842
- Grant:
- EP/S005072/1
- Publisher:
- Wiley
- Journal:
- International Journal for Numerical Methods in Engineering More from this journal
- Volume:
- 125
- Issue:
- 14
- Article number:
- e7482
- Publication date:
- 2024-04-08
- Acceptance date:
- 2024-02-13
- DOI:
- EISSN:
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1097-0207
- ISSN:
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0029-5981
- Language:
-
English
- Keywords:
- Pubs id:
-
1616645
- Local pid:
-
pubs:1616645
- Deposit date:
-
2024-02-13
- ARK identifier:
Terms of use
- Copyright holder:
- Ammouche and Jérusalem
- Copyright date:
- 2024
- Rights statement:
- © 2024 The Authors. International Journal for Numerical Methods in Engineering published by John Wiley & Sons Ltd. This is an open access article under the terms of the Creative Commons Attribution License, which permits use, distribution and reproduction in any medium, provided the original work is properly cited.
- Licence:
- CC Attribution (CC BY)
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