General formulation of the first-order perturbation-based stochastic homogenization method using many random physical parameters for multi-phase composite materials
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Publication:1637942
DOI10.1007/s00707-017-2096-9zbMath1390.74198OpenAlexW2782757436MaRDI QIDQ1637942
Pin Wen, Shusuke Akimoto, Naoki Takano
Publication date: 12 June 2018
Published in: Acta Mechanica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00707-017-2096-9
Random materials and composite materials (74A40) Homogenization, determination of effective properties in solid mechanics (74Q99) Stochastic and other probabilistic methods applied to problems in solid mechanics (74S60)
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Cites Work
- Analysis of fibrous elastic composites with nonuniform imperfect adhesion
- Uncertainty quantification in computational stochastic multiscale analysis of nonlinear elastic materials
- Three-dimensional stochastic analysis using a perturbation-based homogenization method for elastic properties of composite material considering microscopic uncertainty
- Preprocessing and postprocessing for materials based on the homogenization method with adaptive finite element methods
- Microstructure-based stress analysis and evaluation for porous ceramics by homogenization method with digital image-based modeling.
- The formulation of homogenization method applied to large deformation problem for composite materials
- Probabilistic multiscale analysis of three-phase composite material considering uncertainties in both physical and geometrical parameters at microscale
- Three-scale finite element analysis of heterogeneous media by asymptotic homogenization and mesh superposition methods
- Stochastic finite element analysis of layered composite beams with spatially varying non-Gaussian inhomogeneities
- Parameter perturbation method for dynamic responses of structures with uncertain-but-bounded parameters based on interval analysis
- A stochastic micromechanical model for multiphase composites containing spherical inhomogeneities
- Microstructure-based deep-drawing simulation of knitted fabric reinforced thermoplastics by homogenization theory
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