摘要
采用Lévy-Mises塑性流动理论确立连续铸轧坯塑性变形的本构方程,根据铸坯材料的实际可压缩性,对Lévy-Mises屈服函数进行了修正.用有限单元法建立了变形体的势能泛函,并采用Sumt-Powel罚函数优化方法计算势能泛函的极小值,建立了一种在变温条件下求解塑性变形体位移速度场的数值方法,并由此计算出变形体的应力应变分布及轧制力.实例计算结果与实测值较吻合.
The Lévy Mises plastic flow theory was used to establish the physical equation of aluminum strip in roll casting. The Lévy Mises yield function was modified in consideration of the compressibility of the material. The potential energy function was constructed in finite element model. Its minimal was found by using the method of Sumt Powell penal functional optimization. Thereby the distributions of stress、strain and rolling force of the deformed body was computed. The results were in good agreement with the measured values.
出处
《中南工业大学学报》
CSCD
北大核心
1998年第4期374-377,共4页
Journal of Central South University of Technology(Natural Science)
基金
中国有色金属工业总公司科研基金
关键词
有限元
铝材带坯
连续铸轧
塑性变形
finite element
aluminum strip
continuous roll casting
