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Finite volume based asymptotic homogenization theory for periodic materials under anti-plane shear

Zhelong He, Marek‐Jerzy Pindera

2020European Journal of Mechanics - A/Solids16 citationsDOI

Topics & Concepts

Homogenization (climate)MicromechanicsAsymptotic homogenizationDiscretizationFinite volume methodPlane stressStiffnessStiffness matrixMathematical analysisAsymptotic expansionDirect stiffness methodMathematicsStress fieldRepresentative elementary volumeFinite element methodMechanicsPhysicsMaterials scienceComposite materialBiodiversityBiologyComposite numberThermodynamicsEcologyAlgorithmNonlocal and gradient elasticity in micro/nano structuresComposite Material MechanicsNumerical methods in engineering
Finite volume based asymptotic homogenization theory for periodic materials under anti-plane shear | Litcius