摘要
用独立、连续、映射(ICM)方法解决具有屈曲约束的连续体拓扑优化问题.引入独立、连续的拓扑变量,建立以质量为目标,屈曲临界力为约束的连续体结构拓扑优化模型.借助Taylor expansion将目标函数作二阶近似展开;借助Rayleigh’s quotient,Taylor expansion,过滤函数将约束化为近似显函数,减少了灵敏度的计算量将优化模型用对偶规划方法求解,减少了设计变量的数目,缩小了模型的求解规模,得到较为理想的拓扑优化结果.算例表明,ICM方法在屈曲约束的连续体结构拓扑优化中可行性好、效率较高.
In this paper, according to the ICM (Independent Continuous Mapping) method, the topology optimization problem of continuum structures with the buckling constraints are solved. The continuous independent topological variables are used in this problem. The topology optimization model for the continuum structure is constructed, which has the minimized weight as the objective function subjected to the buckling constraints. Based on the Taylor expansion, the filtering function and the Rayleigh s quotient, the ...
出处
《北京工业大学学报》
CAS
CSCD
北大核心
2006年第S1期9-13,共5页
Journal of Beijing University of Technology
基金
国家自然科学基金重点项目(10472003)
北京市自然科学基金项目(3042002)
关键词
ICM方法
拓扑
优化
屈曲
ICM method
topology
optimization
buckling