| 曹琳婷,王丁喜,黄秀全.叶轮机气弹耦合方程求解的时间推进方法评估[J].航空发动机,2022,48(5):94-100 |
| 叶轮机气弹耦合方程求解的时间推进方法评估 |
| Evaluation of Time-marching Method for Solving Aeroelastic Coupled Equations of Turbomachinery |
| |
| DOI: |
| 中文关键词: 叶轮机 流固耦合 颤振 时域分析 经典龙格-库塔 航空发动机 |
| 英文关键词:turbomachinery fluid-structure coupling flutter time-domain classical Runge-Kutta aeroengine |
| 基金项目:国家科技重大专项(2017-Ⅱ-0009-0023)资助 |
|
| 摘要点击次数: 1001 |
| 全文下载次数: 1014 |
| 中文摘要: |
| 为了提高叶轮机颤振预测时的计算效率,同时兼顾求解的稳定性,有必要选取最适合的时间推进方法。基于降阶结构
动力学方程的双向流固耦合方法常用于压气机气弹性能分析,针对气动弹性控制方程中结构动力学方程考查了多种时间推进方
法对计算结果的影响。通过单自由度弹簧系统的数值求解探讨了不同时间推进方法的特点;选取实际压气机算例NASA Rotor 67
进行颤振流固耦合分析,进行大量数值试验找到了各时间推进方法需要的最大时间步长,以此为依据对比出不同时间推进方法的
计算效率。结果表明:采用单自由度弹簧系统和压气机颤振耦合求解得出的结论基本一致,说明时间推进方法的性能更多地与方
法本身的数学性质有关,但是流固耦合求解时流场和结构的信息交互会带来一定影响。以实际颤振算例叶片瞬态响应振幅的对
数衰减率作为衡量精度的标准,经典龙格-库塔方法是颤振耦合计算达到相同精度耗时最少的方法,其次是4阶隐式Adams方法
和Newmark方法。 |
| 英文摘要: |
| In order to improve the computational efficiency of turbomachinery flutter prediction while considering the stability of solu?
tion,it is necessary to select the most appropriate time-marching method. The two-way fluid-structure coupling method based on the reduced
order structural dynamics equation is often used to analyze the aeroelastic performance of the compressor. For the structural dynam?
ics equation in the aeroelastic control equation,the influence of various time-marching methods on the calculation results was investigated.
The characteristics of different time-marching methods were discussed through numerical solution of single degree of freedom spring sys?
tem. NASA Rotor 67 was selected for flutter fluid-structure coupling analysis as a compressor case study,and a large number of numerical
tests were carried out to find the maximum time step required by each time-marching method. Based on this,the calculation efficiency of
different time-marching methods was compared. The results show that the conclusions obtained by using the single degree of freedom
spring system and compressor flutter coupling solution are basically consistent,indicating that the performance of time-marching method is
more related to the mathematical properties of the method itself,but the interaction of information between the flow field and the structure
has a certain impact during a fluid-structure coupling solution. Taking the logarithmic decay rate of the blade transient response amplitude
in the actual flutter calculation case as the measure of accuracy,the classical Runge-Kutta method is the least time-consuming method to
achieve the same accuracy in flutter coupling calculation,followed by the 4th order implicit Adams method and Newmark method. |
| 查看全文 查看/发表评论 下载PDF阅读器 |