|
| |
基于Nitsche方法与拟牛顿求解的二维接触问题等几何分析 |
ISOGEOMETRIC ANALYSIS OF 2D CONTACT PROBLEMS BASED ON THE NITSCHE’S METHOD AND QUASI-NEWTON SOLVER |
投稿时间:2020-07-20 修订日期:2020-11-26 |
DOI: |
中文关键词: 等几何 Nitsche 接触 拟牛顿 迭代修正 |
英文关键词:isogeometric Nitsche contact quasi-Newton iteration modification |
基金项目: |
|
摘要点击次数: 58 |
全文下载次数: 0 |
中文摘要: |
在等几何框架内基于Nitsche方法推导了二维无摩擦弹性接触列式,列式的求解采用基于BFGS逆更新的拟牛顿迭代格式。提出了Nitsche接触列式中罚系数的经验公式,提出了拟牛顿求解时迭代的初始化方法,研究了基于割线刚度阵的修正方法以克服因接触面变化而导致的迭代发散。所提出的接触分析方法在粗糙网格下也能精确描述接触边界,列式推导简单,计算量小。算例表明了接触列式和求解方法的有效性。 |
英文摘要: |
In the isogeometric framework, the contact formulation is derived based on the Nitsche’s method, the quasi-Newton iteration format with BFGS inverse updating is employed as the solver. We introduce an empirical formula for the penalty coefficient of the Nitsche’s contact formulation, propose an initialization scheme for iteration initialization, study the adaptive modification based on the secant stiffness matrix in order to overcome the iteration divergence due to contact surface change. The presented contact analysis method can exactly describe the contact boundary even for coarse meshes, and the linearization process and matrix inversion calculation are dropped. Numerical examples indicate the effectiveness of the contact formulation and the solver. |
查看/发表评论 下载PDF阅读器 |