标题
Data-driven topology optimization (DDTO) for three-dimensional continuum structures
作者
关键词
-
出版物
STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
Volume 66, Issue 5, Pages -
出版商
Springer Science and Business Media LLC
发表日期
2023-04-14
DOI
10.1007/s00158-023-03552-6
参考文献
相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。- An efficient and easy-to-extend Matlab code of the Moving Morphable Component (MMC) method for three-dimensional topology optimization
- (2022) Zongliang Du et al. STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
- On the importance of self-consistency in recurrent neural network models representing elasto-plastic solids
- (2021) Colin Bonatti et al. JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
- A topology optimization method for hyperelastic porous structures subject to large deformation
- (2021) Jiaqi Huang et al. International Journal of Mechanics and Materials in Design
- G-MAP123: A mechanistic-based data-driven approach for 3D nonlinear elastic modeling — Via both uniaxial and equibiaxial tension experimental data
- (2021) Jie Chen et al. Extreme Mechanics Letters
- Efficient multi-material continuum topology optimization considering hyperelasticity: achieving local feature control through regional constraints
- (2020) Xiaojia Shelly Zhang et al. MECHANICS RESEARCH COMMUNICATIONS
- Eigenfrequency constrained topology optimization of finite strain hyperelastic structures
- (2020) Anna Dalklint et al. STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
- MAP123-EP: A mechanistic-based data-driven approach for numerical elastoplastic analysis
- (2020) Shan Tang et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Topology optimization of hyperelastic structures using a modified evolutionary topology optimization method
- (2020) Zeyu Zhang et al. STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
- Adaptive multi-material topology optimization with hyperelastic materials under large deformations: A virtual element approach
- (2020) Xiaojia Shelly Zhang et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- A new data-driven topology optimization framework for structural optimization
- (2020) Ying Zhou et al. COMPUTERS & STRUCTURES
- MAP123-EPF: A mechanistic-based data-driven approach for numerical elastoplastic modeling at finite strain
- (2020) Shan Tang et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Thermodynamics-based Artificial Neural Networks for constitutive modeling
- (2020) Filippo Masi et al. JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
- Simple heuristic for data-driven computational elasticity with material data involving noise and outliers: a local robust regression approach
- (2018) Yoshihiro Kanno JAPAN JOURNAL OF INDUSTRIAL AND APPLIED MATHEMATICS
- Distortion energy-based topology optimization design of hyperelastic materials
- (2018) Hao Deng et al. STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
- Explicit structural topology optimization under finite deformation via Moving Morphable Void (MMV) approach
- (2018) Riye Xue et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Topology optimization of hyperelastic structures using a level set method
- (2017) Feifei Chen et al. JOURNAL OF COMPUTATIONAL PHYSICS
- A Manifold Learning Approach to Data-Driven Computational Elasticity and Inelasticity
- (2016) Rubén Ibañez et al. ARCHIVES OF COMPUTATIONAL METHODS IN ENGINEERING
- Data-driven computational mechanics
- (2016) T. Kirchdoerfer et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Topology optimization of geometrically nonlinear structures based on an additive hyperelasticity technique
- (2015) Yangjun Luo et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Interpolation scheme for fictitious domain techniques and topology optimization of finite strain elastic problems
- (2014) Fengwen Wang et al. COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING
- Element deformation scaling for robust geometrically nonlinear analyses in topology optimization
- (2014) N. P. van Dijk et al. STRUCTURAL AND MULTIDISCIPLINARY OPTIMIZATION
- Towards the stabilization of the low density elements in topology optimization with large deformation
- (2013) Ricardo Doll Lahuerta et al. COMPUTATIONAL MECHANICS
- Level set based topological shape optimization of geometrically nonlinear structures using unstructured mesh
- (2007) Seung-Hyun Ha et al. COMPUTERS & STRUCTURES
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