王选(合肥工业大学)查看源代码讨论查看历史
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王选,男,合肥工业大学土木与水利工程学院讲师。
人物履历
教育背景
2009/09–2013/06,山西大同大学,数学与应用数学,学士
2013/09–2019/03,大连理工大学,计算力学,博士(硕博连读)
2017/01–2018/01,RMIT University(澳大利亚),土木工程,公派联合培养博士
工作经历
2019/04–至 今,合肥工业大学,土木与水利工程学院,讲师,硕导
科研项目
[1] 安徽省自然科学基金青年项目,不确定载荷下多相材料应力约束鲁棒性优化设计方法研究,2020/07-2022/06,主持;
[2] 合肥工业大学学术新人提升计划A项目,不确定载荷下内嵌组件的连续体结构优化设计方法,2020/04-2021/12,主持;
[3] 合肥工业大学博士学位人员专项资助基金:多相材料连续体结构应力约束拓扑优化,2019/05-2021/4,主持;
[4] 土木工程结构与材料安徽省重点实验室开放基金:考虑故障-安全的工程结构优化设计研究,2019/06-2021/6,主持。
学术成果
[1] Wang, X., Long, K., Hoang, V. N., Hu, P. (2018). An explicit optimization model for integrated layout design of planar multi-component systems using moving morphable bars. Computer Methods in Applied Mechanics and Engineering, 342, 46-70.
[2] Wang, X., Liu, H., Kang, Z., Long, K., Meng, Z. (2021). Topology optimization for minimum stress design with embedded movable holes. Computers & Structures, 244, 106455.
[3] Wang, X., Hu, P., Kang, Z. (2020). Layout optimization of continuum structures embedded with movable components and holes simultaneously. Structural and Multidisciplinary Optimization, 61(2), 555-573.
[4] Wang, X., Zhu, X., Hu, P. (2015). Isogeometric finite element method for buckling analysis of generally laminated composite beams with different boundary conditions. International Journal of Mechanical Sciences, 104, 190-199.
[5] Wang, X., Long, K., Meng, Z., Yu, B., Cheng, C. (2020). Explicit multi-material topology optimization embedded with variable-size movable holes using moving morphable bars. Engineering Optimization, 53,1212-1229.
[6] Hoang,V.N., Wang, X., Nguyen-Xuan, H. (2021). A three-dimensional multiscale approach to optimal design of porous structures using adaptive geometric components. Composite Structures, 273, 114296.
[6] Wang, C., Wang, X., Zhang, X., Hu, P. (2017). Assumed stress quasi-conforming technique for static and free vibration analysis of Reissner-Mindlin plates. International Journal for Numerical Methods in Engineering, 112(4), 303-337.
[7] Long, K., Wang, X., Liu, H. (2019). Stress-constrained topology optimization of continuum structures subjected to harmonic force excitation using sequential quadratic programming. Structural and Multidisciplinary Optimization, 59(5), 1747–1759.
[8] Long, K., Wang, X., Du, Y. (2019). Robust topology optimization formulation including local failure and load uncertainty using sequential quadratic programming. International Journal of Mechanics and Materials in Design, 15(2), 317-332.
[9] Meng, Z., Pang, Y., Pu, Y., Wang, X.* (2020). New hybrid reliability-based topology optimization method combining fuzzy and probabilistic models for handling epistemic and aleatory uncertainties. Computer Methods in Applied Mechanics and Engineering, 363, 112886.
[10] Meng, Z., Wu, Y., Wang, X.*, Ren, S., Yu, B. (2021). Robust topology optimization methodology for continuum structures under probabilistic and fuzzy uncertainties. International Journal for Numerical Methods in Engineering, 122(8), 2095-2111.
[11] 王选, 胡平, 祝雪峰, 盖赟栋. (2016). 考虑结构自重的基于NURBS插值的3D拓扑描述函数法. 力学学报, 48(6), 1437-1445.
[12] 王选, 刘宏亮, 龙凯, 杨迪雄, 胡平. (2018). 基于改进的双向渐进结构优化法的应力约束拓扑优化. 力学学报, 50(2), 385-394.
[13] 王选, 胡平, 龙凯. (2019). 考虑嵌入移动孔洞的多相材料布局优化. 力学学报, 51(3), 852-862.
[14] 程长征, 卞光耀, 王选, 龙凯等 (2020). 连续纤维增强复合材料结构基频最大化设计. 力学学报, 52(5),1422-1430.
[15] 龙凯, 谷先广, 王选. (2017). 基于多相材料的连续体结构动态轻量化设计方法. 航空学报, 38(10), 129-138. [1]