Multiscale computational homogenisation of shear-flexible beam elements: a direct \(\mathrm{FE}^2\) approach
DOI10.1007/s00466-022-02187-6zbMath1503.74112OpenAlexW4281295716WikidataQ113326453 ScholiaQ113326453MaRDI QIDQ2086049
K. M. Yeoh, Leong Hien Poh, Vincent Beng Chye Tan, Tong-Earn Tay
Publication date: 20 October 2022
Published in: Computational Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00466-022-02187-6
multiscale analysisfibre-reinforced composite beamheterogeneous beam structuremulti-point constraintTimoshenko-Ehrenfest beam model
Rods (beams, columns, shafts, arches, rings, etc.) (74K10) Inhomogeneity in solid mechanics (74E05) Finite element methods applied to problems in solid mechanics (74S05) Composite and mixture properties (74E30) Homogenization in equilibrium problems of solid mechanics (74Q05)
Related Items
Cites Work
- Multiple scale analysis of heterogeneous elastic structures using homogenization theory and Voronoi cell finite element method
- Multiscale computational homogenization: review and proposal of a new enhanced-first-order method
- Multiscale cohesive failure modeling of heterogeneous adhesives
- Multi-scale computational homogenization: trends and challenges
- Two scale analysis of heterogeneous elastic-plastic materials with asymptotic homogenization and Voronoi cell finite element model
- Computational micro-to-macro transitions for discretized micro-structures of heterogeneous materials at finite strains based on the minimization of averaged incremental energy.
- A multilevel finite element method (FE\(^{2}\)) to describe the response of highly nonlinear structures using generalized continua.
- Simulation of the multi-scale convergence in computational homogenization approaches
- \(FE^2\) multiscale approach for modelling the elastoviscoplastic behaviour of long fibre SiC/Ti composite materials
- Computational homogenization analysis in finite elasticity: material and structural instabilities on the micro- and macro-scales of periodic composites and their interaction.
- Computational homogenization analysis in finite plasticity. Simulation of texture development in polycrystalline materials
- Prediction of the mechanical behavior of nonlinear heterogeneous systems by multi-level finite element modeling
- Transient multi-scale analysis with micro-inertia effects using direct FE\(^2\) method
- Direct \(\mathrm{FE}^2\) for concurrent multilevel modeling of heterogeneous thin plate structures
- Direct \(\mathrm{FE}^2\) for concurrent multilevel modelling of heterogeneous structures
- On periodic boundary conditions and ergodicity in computational homogenization of heterogeneous materials with random microstructure
- An efficient monolithic solution scheme for FE\(^2\) problems
- Fully implicit formulation of elastoplastic homogenization problem for two-scale analysis
- Computational homogenization of periodic beam-like structures
- Multi-scale second-order computational homogenization of multi-phase materials: a nested finite element solution strategy
- Homogenization assumptions for coupled multiscale analysis of structural elements: beam kinematics
- Computational homogenization for adhesive and cohesive failure in quasi‐brittle solids
- Reduced integration and the shear-flexible beam element
- An algorithm for multipoint constraints in finite element analysis
- Multi‐scale constitutive modelling of heterogeneous materials with a gradient‐enhanced computational homogenization scheme
- Strain-driven homogenization of inelastic microstructures and composites based on an incremental variational formulation
- An approach to micro-macro modeling of heterogeneous materials
- A multi-level computational model for multi-scale damage analysis in composite and porous materials
- A class of general algorithms for multi-scale analyses of heterogeneous media
This page was built for publication: Multiscale computational homogenisation of shear-flexible beam elements: a direct \(\mathrm{FE}^2\) approach
