Locally exact asymptotic homogenization of periodic materials under anti-plane shear loading
From MaRDI portal
Publication:2307810
DOI10.1016/j.euromechsol.2020.103972OpenAlexW3006813881MaRDI QIDQ2307810
Marek-Jerzy Pindera, Zhelong He
Publication date: 25 March 2020
Published in: European Journal of Mechanics. A. Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.euromechsol.2020.103972
periodicitymicromechanicsheterogeneous materialelasticity-based solutionlocally-exact asymptotic homogenization theory
Related Items
A compatible multiscale model for nanocomposites incorporating interface effect ⋮ Multiscale analysis of composite structures based on higher-order asymptotic homogenization with boundary layer correction ⋮ Physically informed deep homogenization neural network for unidirectional multiphase/multi-inclusion thermoconductive composites ⋮ Wave propagation analysis in functionally graded metal foam plates with nanopores ⋮ Finite volume based asymptotic homogenization theory for periodic materials under anti-plane shear ⋮ Homogenized moduli and local stress fields of random fiber composites under homogeneous and periodic boundary conditions
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A model for a composite with anisotropic dissipation by homogenization
- Non-homogeneous media and vibration theory
- A comparison of homogenization and standard mechanics analyses for periodic porous composites
- A multiscale finite element method for elliptic problems in composite materials and porous media
- Microstructural effects in elastic composites
- \(FE^2\) multiscale approach for modelling the elastoviscoplastic behaviour of long fibre SiC/Ti composite materials
- Bounds on non-local effective relations for random composites loaded by configuration-dependent body force
- A micromechanics-based nonlocal constitutive equation and estimates of representative volume element size for elastic composites.
- The influence of scale size on the stability of periodic solids and the role of associated higher-order gradient continuum models.
- A numerical approach for the establishment of strain gradient constitutive relations in periodic heterogeneous materials
- A quantitative assessment of the scale separation limits of classical and higher-order asymptotic homogenization
- A numerical method for computing the overall response of nonlinear composites with complex microstructure
- On rigorous derivation of strain gradient effects in the overall behaviour of periodic heterogeneous media
- Iterated two-scale asymptotic method and numerical algorithm for the elastic structures of composite materials
- Asymptotic study of imperfect interfaces in conduction through a granular composite material
- Homogenization and damage for composite structures
- Homogenization and random evolutions: applications to the mechanics of composite materials
- Homogenization of the Stefan Problem and Application to Magnetic Composite Media
