Exploring new tensegrity structures via mixed integer programming
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Publication:382028
DOI10.1007/s00158-012-0881-6zbMath1274.74273OpenAlexW2019780626MaRDI QIDQ382028
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/s00158-012-0881-6
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Cites Work
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- Form-finding of nonregular tensegrities using a genetic algorithm
- On some fundamental properties of structural topology optimization problems
- On symmetry and non-uniqueness in exact topology optimization
- Non-uniqueness and symmetry of optimal topology of a shell for minimum compliance
- Some symmetry results for optimal solutions in structural optimization
- When is a symmetric pin-jointed framework isostatic?
- The orbit rigidity matrix of a symmetric framework
- Determination of a unique configuration of free-form tensegrity structures
- Symmetric prismatic tensegrity structures. II: Symmetry-adapted formulations
- Tensegrity frameworks: static analysis review
- Topology design of tensegrity structures via mixed integer programming
- A Monte Carlo form-finding method for large scale regular and irregular tensegrity structures
- Exploiting group symmetry in truss topology optimization
- Buckminster fuller's tensegrity structures and Clerk Maxwell's rules for the construction of stiff frames
- A symmetry extension of Maxwell's rule for rigidity of frames
- Group symmetry in interior-point methods for semidefinite program
- Changing the preferred direction of the refined topological vertex
- Stability conditions for tensegrity structures
- Algebraic tensegrity form-finding
- Finite motions from periodic frameworks with added symmetry
- The stiffness of prestressed frameworks: A unifying approach
- TOPOLOGY OPTIMIZATION OF TENSEGRITY STRUCTURES UNDER SELF-WEIGHT LOADS
- A mixed integer programming for robust truss topology optimization with stress constraints
- Tensegrity Systems
- Prestressed pin-jointed structures—Flexibility analysis and prestress design
- Modelling topology optimization problems as linear mixed 0-1 programs
- Second-Order Rigidity and Prestress Stability for Tensegrity Frameworks
- Constructing tensegrity structures from one-bar elementary cells
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