Parallel framework for topology optimization using the method of moving asymptotes
From MaRDI portal
Publication:381968
DOI10.1007/s00158-012-0869-2zbMath1274.74302OpenAlexW2009643192MaRDI QIDQ381968
Niels Aage, Boyan Stefanov Lazarov
Publication date: 15 November 2013
Published in: Structural and Multidisciplinary Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00158-012-0869-2
Optimization of shapes other than minimal surfaces (49Q10) Topological methods for optimization problems in solid mechanics (74P15)
Related Items (22)
On the implementation of a quasi-Newton interior-point method for PDE-constrained optimization using finite element discretizations ⋮ A parallel parameterized level set topology optimization framework for large-scale structures with unstructured meshes ⋮ Machine learning for topology optimization: physics-based learning through an independent training strategy ⋮ An advection-diffusion based filter for machinable designs in topology optimization ⋮ Topology optimization design of 3D electrothermomechanical actuators by using GPU as a co-processor ⋮ Preconditioners for Computing Multiple Solutions in Three-Dimensional Fluid Topology Optimization ⋮ Large-scale parallel topology optimization of three-dimensional incompressible fluid flows in a level set, anisotropic mesh adaptation framework ⋮ Efficient GPU accelerated topology optimization of composite structures with spatially varying fiber orientations ⋮ Topology Optimization Using Multiscale Finite Element Method for High-Contrast Media ⋮ A new three-dimensional topology optimization method based on moving morphable components (MMCs) ⋮ Fast multiscale contrast independent preconditioners for linear elastic topology optimization problems ⋮ Topology optimisation of manufacturable microstructural details without length scale separation using a spectral coarse basis preconditioner ⋮ Overhang control based on front propagation in 3D topology optimization for additive manufacturing ⋮ Multi-scale and multi-material topology optimization of channel-cooling cellular structures for thermomechanical behaviors ⋮ Topology optimization design scheme for broadband non-resonant hyperbolic elastic metamaterials ⋮ Topology optimization of Stokes flow with traction boundary conditions using low-order finite elements ⋮ Reduced-order methods for dynamic problems in topology optimization: a comparative study ⋮ Universal machine learning for topology optimization ⋮ Explicit three dimensional topology optimization via moving morphable void (MMV) approach ⋮ A method using successive iteration of analysis and design for large-scale topology optimization considering eigenfrequencies ⋮ Topology optimization of turbulent flows ⋮ A generalized DCT compression based density method for topology optimization of 2D and 3D continua
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Topology optimization of large scale Stokes flow problems
- Large-scale parallel topology optimization using a dual-primal substructuring solver
- A computational paradigm for multiresolution topology optimization (MTOP)
- A high-performance, portable implementation of the MPI message passing interface standard
- Linear and nonlinear programming.
- A new finite element formulation for computational fluid dynamics. VII. The Stokes problem with various well-posed boundary conditions: Symmetric formulations that converge for all velocity/pressure spaces
- Multifrontal parallel distributed symmetric and unsymmetric solvers
- Parallelized structural topology optimization for eigenvalue problems
- Parallel methods for optimality criteria-based topology optimization
- A Class of Globally Convergent Optimization Methods Based on Conservative Convex Separable Approximations
- Filters in topology optimization based on Helmholtz-type differential equations
- Factorized parallel preconditioner for the saddle point problem
- An Unsymmetric-Pattern Multifrontal Method for Sparse LU Factorization
- Direct Methods for Sparse Linear Systems
- Gmsh: A 3-D finite element mesh generator with built-in pre- and post-processing facilities
- Megapixel Topology Optimization on a Graphics Processing Unit
- The method of moving asymptotes—a new method for structural optimization
- Factorized Sparse Approximate Inverse Preconditionings I. Theory
- A Fast and High Quality Multilevel Scheme for Partitioning Irregular Graphs
- A Preconditioner for Substructuring Based on Constrained Energy Minimization
- Topology optimization of fluids in Stokes flow
- Large-scale topology optimization in 3D using parallel computing
This page was built for publication: Parallel framework for topology optimization using the method of moving asymptotes
