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| Homogenization Method for Dynamic Problems Based on Continuous Size Field |
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Abstract Abstract: A new topological optimization method of continuum structure for dynamic problems is presented based on con-tinuous size field. Based on homogenization theory, hexagonal microstructure with isotropic behavior is adopted as descrip-tion of the macroscopic material. The proper character of the microcosmic cell is numerically validated to avoid localized modes. The size of the hexagonal cell for the material point instead of element or node is accepted as design variables. Con-tinuity of design variables field is ensured by interpolation of the modified filtering interpolation functions. Checkerboard patterns that are a concern in most topological optimization methods are avoided naturally. Sensitivities of global stiffness matrix, global mass matrix and so on are derived according to calculation method for partial derivative of compound function. Topological optimization models are established where dynamic structural responses are taken as objective and prescribed volume fraction is referred to as constraint conditions. Numerical examples show that the proposed method is feasible and robust in dynamic topological optimization design of continuum structure.
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Received: 15 October 2009
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| [1] |
. DESIGN OF FLUTTER OPTIMIZATION FOR MISSILE’S PUCKER RUDDER STRUCTURE BASED ON TOPOLOGY OPTIMIZATION TECHNOLOGY[J]. , 2015, 36(1): 69-75. |
| [2] |
. Topology optimization of closed liquid cell materials based on extended multiscale finite element method[J]. , 2013, 34(4): 342-351. |
| [3] |
. Topology Optimization Design of Actuation Voltage in Plates with Active Constrained Layer Damping Treatments[J]. , 2012, 33(5): 471-479. |
| [4] |
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| [5] |
. Topological Optimization of Plant and Shell Structure with Displacement Constraints under Multiple Load Cases Based on ICM Method[J]. , 2012, 33(1): 0-90. |
| [6] |
. Topology Optimization of Continuum Structures Subjected to Forced Vibration Based on the Element Free Galerkin Method[J]. , 2011, 32(5): 527-533. |
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2011, Vol. 32 
