Add to ORKGIn this work, a new strategy for solving multiscale topology optimization problems is presented. An alternate direction algorithm and a precomputed offline microstructure database (Computational Vademecum) are used to efficiently solve the problem. In addition, the influence of considering manufacturable constraints is examined. Then, the strategy is extended to solve the coupled problem of designing both the macroscopic and microscopic topologies. Full details of the algorithms and numerical examples to validate the methodology are provided.Peer Reviewe
Computational material design has gained considerable interest, along the last years, in the computa...
The two scale topology optimization formulation is a mathematical procedure which focuses on finding...
The topology optimization method solves the basic engineering problem of distributing a limited amou...
In this work, a new strategy for solving multiscale topology optimization problems is presented. An ...
The work deals on computational design of structural materials by resorting to computational homogen...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
Multiscale topological material design, aiming at obtaining optimal distribution of the material at ...
The work deals on computational design of structural materials by resorting to computational homogen...
The work deals on computational design of structural materials by resorting to computational homogen...
Acknowledgments The authors acknowledge the support from Engineering and Physical Sciences Research ...
The present dissertation aims at addressing multiscale topology optimization problems. For this purp...
Computational material design has gained considerable interest, along the last years, in the computa...
Computational material design has gained considerable interest, along the last years, in the computa...
The two scale topology optimization formulation is a mathematical procedure which focuses on finding...
The topology optimization method solves the basic engineering problem of distributing a limited amou...
In this work, a new strategy for solving multiscale topology optimization problems is presented. An ...
The work deals on computational design of structural materials by resorting to computational homogen...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
This paper introduces a new approach to multiscale optimization, where design optimization is applie...
Multiscale topological material design, aiming at obtaining optimal distribution of the material at ...
The work deals on computational design of structural materials by resorting to computational homogen...
The work deals on computational design of structural materials by resorting to computational homogen...
Acknowledgments The authors acknowledge the support from Engineering and Physical Sciences Research ...
The present dissertation aims at addressing multiscale topology optimization problems. For this purp...
Computational material design has gained considerable interest, along the last years, in the computa...
Computational material design has gained considerable interest, along the last years, in the computa...
The two scale topology optimization formulation is a mathematical procedure which focuses on finding...
The topology optimization method solves the basic engineering problem of distributing a limited amou...