Clustering analysis for elastodynamic homogenization
DOI10.1007/s00466-023-02315-wzbMath1528.74092OpenAlexW4361291146MaRDI QIDQ6084768
Publication date: 2 December 2023
Published in: Computational Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00466-023-02315-w
wave propagationGreen functionLippmann-Schwinger equationreduced-order methodBloch wave expansionaveraged dynamic field tensorthree-dimensional particle-reinforced composite
Bulk waves in solid mechanics (74J10) Composite and mixture properties (74E30) Numerical and other methods in solid mechanics (74S99) Homogenization and oscillations in dynamical problems of solid mechanics (74Q10)
Cites Work
- Unnamed Item
- Unnamed Item
- Willis elastodynamic homogenization theory revisited for periodic media
- High frequency homogenization for structural mechanics
- Overall dynamic constitutive relations of layered elastic composites
- Homogenisation for elastic photonic crystals and dynamic anisotropy
- A variational approach to the theory of the elastic behaviour of multiphase materials
- Non-homogeneous media and vibration theory
- A polarization approach to the scattering of elastic waves. I. Scattering by a single inclusion
- A polarization approach to the scattering of elastic waves. II. Multiple scattering from inclusions
- Harmonic waves in three-dimensional elastic composites
- From virtual clustering analysis to self-consistent clustering analysis: a mathematical study
- FEM-cluster based reduction method for efficient numerical prediction of effective properties of heterogeneous material in nonlinear range
- Data science for finite strain mechanical science of ductile materials
- Adaptive selection of reference stiffness in virtual clustering analysis
- Efficient multiscale modeling for woven composites based on self-consistent clustering analysis
- Efficient prediction of the effective nonlinear properties of porous material by FEM-cluster based analysis (FCA)
- Self-consistent clustering analysis: an efficient multi-scale scheme for inelastic heterogeneous materials
- On asymptotic elastodynamic homogenization approaches for periodic media
- Overall dynamic properties of three-dimensional periodic elastic composites
- Effective constitutive relations for waves in composites and metamaterials
- The determination of the elastic field of an ellipsoidal inclusion, and related problems
- High-frequency homogenization for periodic media
- Data-Driven Self-consistent Clustering Analysis of Heterogeneous Materials with Crystal Plasticity
- Analytical formulation of three-dimensional dynamic homogenization for periodic elastic systems
- On modifications of Newton's second law and linear continuum elastodynamics
This page was built for publication: Clustering analysis for elastodynamic homogenization
