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论文:2023,Vol:41,Issue(4):722-731 |
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引用本文: |
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苏瑜, 唐和生. 有限信息下基于证据理论的桁架结构多目标拓扑优化设计[J]. 西北工业大学学报 |
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SU Yu, TANG Hesheng. Multi-objective topology optimization design of truss structures based on evidence theory under limited information[J]. Journal of Northwestern Polytechnical University |
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| 有限信息下基于证据理论的桁架结构多目标拓扑优化设计 |
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| 苏瑜1, 唐和生2 |
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1. 湖北工业大学 土木建筑与环境学院, 湖北 武汉 430068;
2. 同济大学 土木工程学院, 上海 200092 |
| 摘要: |
| 不确定信息往往是缺乏的、具有较大的离散性,如何在认知不确定性扰动下保证结构具有良好的稳健性成为多目标拓扑优化设计的技术难题。引入证据理论量化认知不确定,采用基于失效似然度的失效概率区间上限建立新的可靠性指标,将结构总质量和结构可靠性同时作为优化目标,提出了基于证据理论的多目标拓扑优化设计模型。采用无需梯度信息且具有出色非支配策略的多目标并行化微分演化算法求解Pareto最优前沿。为了验证所提方法的有效性,以木桁架结构为优化对象,选取木材的弹性模量和结构荷载为不确定变量,采用所提方法进行多目标拓扑优化。根据优化结果制作6榀相同的桁架试件进行随机静力加载试验,通过试验所得的应力及节点位移判断桁架结构的失效概率,以此验证基于证据理论的稳健性拓扑优化方法的可行性。试验结果表明,基于证据理论的优化方法可以避免认知不确定波动造成的优化结果的偏差,为设计人员提供了一种在考虑数据信息不充足、认知水平有限等情况下仍能使优化结果具有稳健性的新方法。 |
| 关键词:
认知不确定性
证据理论
桁架结构
多目标优化
并行化计算
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| Multi-objective topology optimization design of truss structures based on evidence theory under limited information |
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| SU Yu1, TANG Hesheng2 |
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1. School of Civil Engineering, Architecture and Environment, Hubei University of Technology, Wuhan 430068, China;
2. College of Civil Engineering, Tongji University, Shanghai 200092, China |
| Abstract: |
| Uncertainty information is often limited and has great discreteness, how to ensure the structure having good robustness under epistemic uncertainty becomes a technical problem for multi-objective topology optimization design. In this paper, the evidence theory is used to quantify the epistemic uncertainty; the plausibility measurement expressing upper limit of failure probability is applied to be a new evaluation of reliability. The total weight and the reliability of structures are taken as the optimization objectives, and a multi-objective robust topology optimization design model based on evidence theory is proposed. Parallelization technique based differential evolution for multi-objective optimization (DEMO) is preferable to search above robust Pareto front due to its merits of non-requirement of any gradient and superior mechanisms of non-dominate strategy. In order to verify the effectiveness of the proposed method, the multi-objective reliability optimization of a wood truss structure is implemented with considering elastic modulus and structural load as uncertain variables. According to the optimization results, six same truss specimens are made for the static random loading test. The failure probability of the truss structure is judged by the stress and node displacement obtained from the test, so as to verify the feasibility of the reliability optimization method based on evidence theory. The experimental results also indicate that the proposed method can avoid the deviation of the optimization results caused by the fluctuation of epistemic uncertainty, and provide a new method for designers to make the optimization results robust even when the data information is insufficient and the cognitive level is limited. |
| Key words:
epistemic uncertainty
evidence theory
uncertainty quantification
multi-objective optimization design
parallel computation
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| 收稿日期: 2022-09-05
修回日期:
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| DOI: 10.1051/jnwpu/20234140722 |
| 基金项目: 国家自然科学基金(51178337)与湖北省自然科学基金青年项目(2018CFB287)资助 |
| 通讯作者:
Email: |
| 作者简介: 苏瑜(1985—),湖北工业大学讲师,主要从事不确定量化、结构可靠性分析及优化设计研究。e-mail:su_jingde@126.com
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| 作者相关文章 |
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| 苏瑜 在本刊中的所有文章 |
| 唐和生 在本刊中的所有文章 |
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参考文献: |
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[1] WEI F, ZHANG L, YANG S, et al. A multiobjective evolutionary algorithm based on coordinate transformation[J]. IEEE Trans on Cybernetics, 2018, 49:2732
[2] 刘国强, 陈维义, 陈华东, 等. 混沌量子粒子群算法舰炮反后座装置的多目标优化[J]. 哈尔滨工程大学学报, 2020, 41(5): 655-660 LIU Guoqiang, CHEN Weiyi, CHEN Huadong, et al. Multi-objective optimization of artillery recoil mechanism based on the chaotic quantum particle swarm optimization algorithm[J]. Journal of Harbin Engineering University, 2020, 41(5): 655-660 (in Chinese)
[3] 张运涛, 李以农, 张志达, 等. 基于改进粒子群算法的非对称传动主轴多目标优化[J]. 振动与冲击, 2022, 41(2):130-139 ZHANG Yuntao, LI Yinong, ZHANG Zhida, et al. Multi objective optimization of an asymmetric transmission spindle based on improved particle swarm optimization[J]. Journal of Vibration and Shock, 2022, 41(2):130-139 (in Chinese)
[4] 苏瑜, 唐和生, 薛松涛, 等. 基于证据理论的结构非概率可靠性拓扑优化设计[J]. 中国科学:技术科学, 2019, 49(3): 320-330 SU Yu, TANG Hesheng, XUE Songtao, et al. Approach of non-probabilistic reliability topology optimization using evidence theory[J]. Scientia Sinica Technologica, 2019, 49(3): 320-330 (in Chinese)
[5] ZHANG Z, JIANG C, RUAN X X, et al. A novel evidence theory model dealing with correlated variables and the corresponding structural reliability analysis method[J]. Structural and Multidisciplinary Optimization, 2018, 57: 1749-1764
[6] 王巨. 基于证据理论的可靠性设计优化方法及其在汽车轻量化的应用[D]. 长沙:湖南大学, 2019 WANG Ju. Evidence-based reliability design optimization and its application in automobile lightweight[D]. Changsha: Hunan University, 2019 (in Chinese)
[7] 刘鑫, 龚敏, 周振华, 等. 基于证据理论的机械结构高效可靠性分析方法[J]. 中国机械工程, 2020, 31(17): 2031-2037 LIU Xin, GONG Min, ZHOU Zhenhua, et al. An efficient mechanical structure reliability analysis method based on evidence theory[J]. China Mechanical Engineering, 2020, 31(17): 2031-2037 (in Chinese)
[8] HUANG Z L, JIANG C, ZHANG Z, et al. A decoupling approach for evidence-theory-based reliability design optimization[J]. Structural and Multidisciplinary Optimization, 2017, 56 (1): 647-661
[9] LI D W, TANG H S, XUE S T, et al. Adaptive sub-interval perturbation-based computational strategy for epistemic uncertainty in structural dynamics with evidence theory[J]. Probabilistic Engineering Mechanics, 2018, 53: 75-86
[10] 于俊涛, 邓卫, 王巨, 等. 基于近似移动矢量的证据理论可靠性设计优化方法[J]. 湖南大学学报, 2021, 48(8): 59-67 YU Juntao, DENG Wei, WANG Ju, et al. An Evidence-theory-based reliability design optimization method using approximate shifting vector[J]. Journal of Hunan University, 2021, 48(8): 59-67 (in Chinese)
[11] ROBIC T, FILIPIC B. DEMO: differential evolution for multiobjective optimization[J]. Evolutionary Multi-Criterion Optimization, 2005, 3410: 520-533
[12] SRIVASTAVA R K, DEB K, TULSHYAN R. An evolutionary algorithm based approach to design optimization using evidence theory[J]. Journal of Mechanical Design, 2013, 135(8): 1-12
[13] 中华人民共和国建设部. 木结构设计规范[S]. GB50005-2003, 2003
[14] 木结构设计手册编辑委员会. 木结构手册[M]. 3版. 北京: 中国建筑工业出版社, 2005 Wood structure design manual editorial committee. Wood structure manual[M]. 3rd edition. Beijing: China Architecture & Building Press, 2005 (in Chinese)
[15] SALEHGHAFFARI S, RAIS-ROHANI M, MARIN E B, et al. Optimization of structures under material parameter uncertainty using evidence theory[J]. Engineering Optimization, 2013, 45 (9): 1027-1041 |
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