Litcius/Paper detail

A modified FFT-based solver for the mechanical simulation of heterogeneous materials with Dirichlet boundary conditions

Lionel Gélébart

2020Comptes Rendus Mécanique42 citationsDOIOpen Access PDF

Abstract

Fast Fourier transform based algorithms, relying on the initial idea proposed by Moulinec and Suquet in 1998, are very efficient in the context of periodic homogenization in solid mechanics. The purpose of this short note is to propose a simple modification of these algorithms to extend their application domain from periodic boundary conditions (BC) to Dirichlet BC. The method is validated by a direct comparison with standard finite element simulations with prescribed displacements at the boundary. The convergence properties of the iterative algorithm are then analyzed using a simple example (2D matrix–inclusion) as a function of various parameters (material and algorithm parameters).

Topics & Concepts

Homogenization (climate)Fast Fourier transformSolverDirichlet boundary conditionPeriodic boundary conditionsFinite element methodBoundary value problemFourier seriesAlgorithmConvergence (economics)Applied mathematicsComputer scienceMathematicsDirichlet distributionMathematical analysisMathematical optimizationStructural engineeringEngineeringEconomicsBiologyEconomic growthEcologyBiodiversityComposite Material MechanicsAdvanced Mathematical Modeling in EngineeringComposite Structure Analysis and Optimization