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A fast Fourier transform based method for computing the effective crack energy of a heterogeneous material on a combinatorially consistent grid

Felix Ernesti, Matti Schneider

2021International Journal for Numerical Methods in Engineering28 citationsDOIOpen Access PDF

Abstract

Abstract This work is concerned with computing the effective crack energy of periodic and random media which arises in mathematical homogenization results for the Francfort–Marigo model of brittle fracture. A previous solver based on the fast Fourier transform (FFT) led to solution fields with ringing or checkerboard artifacts and was limited in terms of the achievable accuracy. As computing the effective crack energy may be recast as a continuous maximum flow problem, we suggest using the combinatorial continuous maximum flow discretization introduced by Couprie et al. The latter is devoid of artifacts, but lacks an efficient large‐scale solution method. We fill this gap and introduce a novel solver which relies upon the FFT and a doubling of the local degrees of freedom which is resolved by the alternating direction method of multipliers (ADMM). Last but not least we provide an adaptive strategy for choosing the ADMM penalty parameter, further speeding up the solution procedure. We demonstrate the salient features of the proposed approach on problems of industrial scale.

Topics & Concepts

SolverFast Fourier transformDiscretizationGridHomogenization (climate)Fourier transformComputer scienceEnergy (signal processing)AlgorithmMathematical optimizationApplied mathematicsMathematicsMathematical analysisWork (physics)Flow (mathematics)Discrete Fourier transform (general)Fourier seriesSalientDFT matrixGibbs phenomenonNumerical methods in engineeringComposite Material MechanicsAdvanced Mathematical Modeling in Engineering
A fast Fourier transform based method for computing the effective crack energy of a heterogeneous material on a combinatorially consistent grid | Litcius