A LEVEL SET METHOD FOR MICROSTRUCTURE DESIGN OF COMPOSITE MATERIALS 被引量：1

A LEVEL SET METHOD FOR MICROSTRUCTURE DESIGN OF COMPOSITE MATERIALS

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摘要 Based on a level set model and the homogenization theory, an optimization al- gorithm for ?nding the optimal con?guration of the microstructure with speci?ed properties is proposed, which extends current research on the level set method for structure topology opti- mization. The method proposed employs a level set model to implicitly describe the material interfaces of the microstructure and a Hamilton-Jacobi equation to continuously evolve the ma- terial interfaces until an optimal design is achieved. Meanwhile, the moving velocities of level set are obtained by conducting sensitivity analysis and gradient projection. Besides, how to handle the violated constraints is also discussed in the level set method for topological optimization, and a return-mapping algorithm is constructed. Numerical examples show that the method exhibits outstanding ?exibility of handling topological changes and ?delity of material interface represen- tation as compared with other conventional methods in literatures. Based on a level set model and the homogenization theory, an optimization al- gorithm for ?nding the optimal con?guration of the microstructure with speci?ed properties is proposed, which extends current research on the level set method for structure topology opti- mization. The method proposed employs a level set model to implicitly describe the material interfaces of the microstructure and a Hamilton-Jacobi equation to continuously evolve the ma- terial interfaces until an optimal design is achieved. Meanwhile, the moving velocities of level set are obtained by conducting sensitivity analysis and gradient projection. Besides, how to handle the violated constraints is also discussed in the level set method for topological optimization, and a return-mapping algorithm is constructed. Numerical examples show that the method exhibits outstanding ?exibility of handling topological changes and ?delity of material interface represen- tation as compared with other conventional methods in literatures.

作者 MeiYnlin WangXiaoming

机构地区 MechanicalEngineeringDepartment

出处《Acta Mechanica Solida Sinica》 SCIE EI 2004年第3期239-250,共12页 固体力学学报（英文版）

基金 Project supported by the National Natural Science Foundation of China (Nos. 59805001 and 10332010) and the KeyScience and Technology Research Project of Ministry of Education of China (No. 104060).

关键词 level set method HOMOGENIZATION gradient projection microstructures design level set method, homogenization, gradient projection, microstructures design

分类号 TB301 [一般工业技术—材料科学与工程]

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参考文献16

1梅玉林,王晓明.A LEVEL SET METHOD FOR STRUCTURAL TOPOLOGY OPTIMIZATION WITH MULTI-CONSTRAINTS AND MULTI-MATERIALS[J].Acta Mechanica Sinica,2004,20(5):507-518. 被引量：8
2O. Sigmund.A 99 line topology optimization code written in Matlab[J].Structural and Multidisciplinary Optimization.2001(2)
3M. P. Bends?e,O. Sigmund.Material interpolation schemes in topology optimization[J].Archive of Applied Mechanics (-).1999(9-10)
4H. A. Eschenauer,V. V. Kobelev,A. Schumacher.Bubble method for topology and shape optimization of structures[J].Structural Optimization.1994(1)
5A. R. Díaz,M. P. Bends?e.Shape optimization of structures for multiple loading conditions using a homogenization method[J].Structural Optimization.1992(1)
6M. P. Bends?e.Optimal shape design as a material distribution problem[J].Structural Optimization.1989(4)
7Michael Y.W.,Wang X.M.,Guo D.M.A Level Set for Structural Topology Optimization[].Computer Methods.2003
8Silva,E.,Nishiwaki,S.,Fonseca,J.,Kikuchi,N.Optimization methods applied to material and flextensional actuator design using the homogenization method[].Comput Method Appl M.1999
9Sokolowski,JP,Zolesio,J. Introduction to Shape Optimization: Shape Sensitivity Analysis . 1992
10Bendsoe,MP. Optimization of Structural Topology, Shape and Material . 1997

二级参考文献22

1Sokolowski JP, Zolesio J. Introduction to Shape Optimization: Shape Sensitivity Analysis. New York:Springer-Verlag, 1992
2Bendsoe MP. Optimization of Structural Topology,Shape and Material. Berlin: Springer, 1997
3Bendsoe MP. Optimal shape design as a material distribution problem. Structural Optimization, 1989, 1:193-202
4Diaz AR. Bendoe MP. Shape optimization of structures for multiple loading conditions using a homogenization method. Structural Optimization, 1992, 4:17-22
5Allaire G, Kohn RV. Topology optimization and optimal shape design using homogenization. Topology Design of Structures, Kluwer, 1993, volume 227 of NATOASI Series, Series E: 207-218
6Bendsoe MP, Sigmund O. Material interpolations in topology optimization. Archive of Applied Mechanics,1999, 69:635-654
7Sigmund O. Topology optimization: A tool for the tailoring of structures and materials. Phil Trans: Math Phys Eng Sci, 2000, 358:211-228
8Bendsoe MP. Optimization of structural topology. In:Shape and Material, Berlin: Springer, 1997
9Sigmund O. A 99 topology optimization code written in Matlab. Structural and Multidisciplinary Optimization, 2001, 21:120-718
10Sigmund O. On the design of compliant mechanisms using topology optimization. Danish Center for Applied Mathematics and Mechanics Report No.535,1996

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1张晖,刘书田,张雄.考虑自重载荷作用的连续体结构拓扑优化[J].力学学报,2009,41(1):98-104. 被引量：9
2高彤,张卫红,Duysinx Pierre.多相材料结构拓扑优化：体积约束还是质量约束？[J].力学学报,2011,43(2):296-305. 被引量：10
3Sutthisak Phongthanapanich,Pramote Dechaumphai.An explicit finite volume element method for solving characteristic level set equation on triangular grids[J].Acta Mechanica Sinica,2011,27(6):911-921. 被引量：1
4王宪杰,张洵安.多相材料微结构布局及宏观结构拓扑并发优化[J].计算力学学报,2015,32(6):716-721. 被引量：1
5贾娇,龙凯,程伟.稳态热传导下基于多相材料的一体化设计[J].航空学报,2016,37(4):1218-1227. 被引量：1
6Hong-Ling Ye,Zong-Jie Dai,Wei-Wei Wang,Yun-Kang Sui.ICM method for topology optimization of multimaterial continuum structure with displacement constraint[J].Acta Mechanica Sinica,2019,35(3):552-562. 被引量：5
7Pooya Rostami,Javad Marzbanrad.Hybrid algorithms for handling the numerical noise in topology optimization[J].Acta Mechanica Sinica,2020,36(2):536-554. 被引量：2

同被引文献17

1Luo Zhen,Du Yixian,Chen Liping,Yang Jingzhou,Karim Abdel-Malek.CONTINUUM TOPOLOGY OPTIMIZATION FOR MONOLITHIC COMPLIANT MECHANISMS OF MICRO-ACTUATORS[J].Acta Mechanica Solida Sinica,2006,19(1):58-68. 被引量：6
2Z. Luo,L. Chen,J. Yang,Y. Zhang,K. Abdel-Malek.Compliant mechanism design using multi-objective topology optimization scheme of continuum structures[J].Structural and Multidisciplinary Optimization.2005(2)
3T. Buhl,C.B.W. Pedersen,O. Sigmund.Stiffness design of geometrically nonlinear structures using topology optimization[J].Structural and Multidisciplinary Optimization.2000(2)
4M. P. Bends?e,O. Sigmund.Material interpolation schemes in topology optimization[J].Archive of Applied Mechanics (-).1999(9-10)
5O. Sigmund,J. Petersson.Numerical instabilities in topology optimization: A survey on procedures dealing with checkerboards, mesh-dependencies and local minima[J].Structural Optimization.1998(1)
6A. Díaz,O. Sigmund.Checkerboard patterns in layout optimization[J].Structural Optimization.1995(1)
7T. Belytschko,D. Organ,Y. Krongauz.A coupled finite element-element-free Galerkin method[J].Computational Mechanics.1995(3)
8Howell,L.L.Compliant Mechanisms[]..2001
9Howell,L.L.,and Midha,A.A method for design of compliant mechanisms with small length flexural pivots[].Journal of Mechanical Design.1994
10Bendse,M.P,and Sigmund,O.Topology Optimization:Theory,Methods,and Applications[]..2003

引证文献1

1Yixian Du,Liping Chen,Zhen Luo.TOPOLOGY SYNTHESIS OF GEOMETRICALLY NONLINEAR COMPLIANT MECHANISMS USING MESHLESS METHODS[J].Acta Mechanica Solida Sinica,2008,21(1):51-61. 被引量：3

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1龙凯,左正兴.基于节点密度法的连续体结构拓扑优化结果提取[J].北京理工大学学报,2008,28(8):706-710. 被引量：3
2龙凯,左正兴,肖涛,Rehan H.Zuberi.ICM Method Combined with Meshfree Approximation for Continuum Structure[J].Journal of Beijing Institute of Technology,2010,19(3):279-285.
3Fei Yan Xiating Feng Hui Zhou 1(State Key Laboratory of Geomechanics and Geotechnical Engineering,Institute of Rock and Soil Mechanics,Chinese Academy of Science,Wuhan 430071,China).MESHLESS METHOD OF DUAL RECIPROCITY HYBRID RADIAL BOUNDARY NODE METHOD FOR ELASTICITY[J].Acta Mechanica Solida Sinica,2010,23(5):447-458. 被引量：2

1ZHANG XianMin,OUYANG GaoFei.A level set method for reliability-based topology optimization of compliant mechanisms[J].Science China(Technological Sciences),2008,51(4):443-455. 被引量：6
2Topological robusmess microgears[J].光电工程,2017,44(2):251-251.
3滕风恩,姜汉成.复合材料的细观微观结构设计与性能预测[J].材料导报,1992,6(2):67-71. 被引量：1
4胡燕萍.超材料在军事领域的应用[J].国际航空,2016,0(12):63-65.
5李世军,樊建平,漆炜,陈旭勇.非概率区间模型可靠性指标的梯度投影算法[J].计算力学学报,2013,30(2):192-197. 被引量：5
6T.Liu,Z.C.Deng,T.J.Lu.Structural modeling of sandwich structures with lightweight cellular cores[J].Acta Mechanica Sinica,2007,23(5):545-559. 被引量：11
7ZHANG Leilei LI Hejun LI Kezhi ZHAO Xueni WU Heng CAO Sheng.MG63 Osteoblast-like Cells Growth Behaviour on Carbon/Carbon Composites with Different Carbon Matrixes[J].Chinese Journal of Mechanical Engineering,2011,24(2):303-308. 被引量：1
8新型.西南科技大学在纳米能源材料研究领域取得新进展[J].化工新型材料,2016,44(2):253-253.
9刘永长,杨根仓,吕衣礼.喷雾共沉积法制备高性能金属基复合材料的新思路[J].材料导报,1996,10(5):65-67. 被引量：2
10吴望一,谭文长,李娟,谢文俊.THEORETICAL STUDY ON THE BIFURCATION OF VORTEXES STRUCTURE FOR FLOW IN CURVED TUBE[J].Applied Mathematics and Mechanics(English Edition),2000,21(12):1345-1358.

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