Efficient fixed point and Newton–Krylov solvers for FFT-based homogenization of elasticity at large deformations

In recent years the FFT-based homogenization method of Moulinec and Suquet has been established as a fast, accurate and robust tool for obtaining effective properties in linear elasticity and conductivity problems. In this work we discuss FFT-based homogenization for elastic problems at large deform...

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Bibliographic Details
Published in:Computational mechanics 2014-12, Vol.54 (6), p.1497-1514
Main Authors: Kabel, Matthias, Böhlke, Thomas, Schneider, Matti
Format: Article
Language:English
Subjects:
Analysis
Approximation
Classical and Continuum Physics
Computational Science and Engineering
Deformation
Elastic deformation
Elasticity
Engineering
Engineering Sciences
Exact solutions
Fiber reinforced polymers
Fixed points (mathematics)
Glass fiber reinforced plastics
Homogenization
Homogenizing
Iterative methods
Laminated materials
Mathematical models
Mechanics
Mechanics of materials
Nonlinearity
Original Paper
Solvers
Theoretical and Applied Mechanics
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Summary:In recent years the FFT-based homogenization method of Moulinec and Suquet has been established as a fast, accurate and robust tool for obtaining effective properties in linear elasticity and conductivity problems. In this work we discuss FFT-based homogenization for elastic problems at large deformations, with a focus on the following improvements. Firstly, we exhibit the fixed point method introduced by Moulinec and Suquet for small deformations as a gradient descent method. Secondly, we propose a Newton–Krylov method for large deformations. We give an example for which this methods needs approximately 20 times less iterations than Newton’s method using linear fixed point solvers and roughly 100 times less iterations than the nonlinear fixed point method. However, the Newton–Krylov method requires 4 times more storage than the nonlinear fixed point scheme. Exploiting the special structure we introduce a memory-efficient version with 40 % memory saving. Thirdly, we give an analytical solution for the micromechanical solution field of a two-phase isotropic St.Venant–Kirchhoff laminate. We use this solution for comparison and validation, but it is of independent interest. As an example for a microstructure relevant in engineering we discuss finally the application of the FFT-based method to glass fiber reinforced polymer structures.
ISSN:0178-7675
1432-0924
DOI:10.1007/s00466-014-1071-8