Comparison of Earthquake Input Methods in Soil-structure Interaction Analysis
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摘要: 地震作用下土-结构动力相互作用的整体有限元分析需要在人工边界处输入地震动。目前可能采用的地震输入方法包括黏弹性边界自由场输入方法、自由场应力方法、自由场位移方法以及侧边界自由方法。由于采用近似人工边界条件或者未完全考虑地震自由场,上述地震输入方法均为近似方法。本文以大开地铁车站二维有限元分析为例,根据规范建议的边界位置,研究了上述地震输入方法的精度,研究成果可为土-结构相互作用分析的合理地震输入提供一定参考。
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关键词:
- 土-结构动力相互作用 /
- 地震输入 /
- 黏弹性边界 /
- 自由场 /
- 有限元分析
Abstract: The earthquake input is required in the finite element analysis of the seismic soil-structure interaction. The earthquake input methods that can be used in engineering at present include the free-field input method based on viscous-spring boundary, the free-field stress method, the free-field displacement method, and the free lateral boundary method. The results from these methods are all approximate due to the approximate artificial boundary condition or no consideration of the seismic free field. In this paper, the accuracies of the results by these methods are compared by the 2-dimensional finite element analysis of the Daikai subway station where the artificial boundary position is determined according to the code. This work can give a reference on the earthquake input in the soil-structure interaction analysis. -
图 1 地震作用下土-结构相互作用分析模型示意图
Figure 1. Dynamic soil-structure interaction model under earthquake
图 4 大开车站的土-结构系统有限元模型
Figure 4. Finite element model of soil-structure system of Daikai station
图 5 黏弹性边界自由场输入方法的计算结果(采用文献(刘晶波等,2005a)的黏弹性边界)
Figure 5. Results of the free field input method based on viscous-spring boundary (after Liu et al., 2005a)
图 6 黏弹性边界自由场输入方法的计算结果(采用文献(杜修力等,2006a)的黏弹性边界)
Figure 6. Results of the free field input method based on viscous-spring boundary (from Du et al., 2006)
图 7 黏弹性边界自由场输入方法的计算结果
Figure 7. Results of the free field input method based on viscous-spring boundary
图 8 土-结构相互作用与自由场分析在左侧人工边界深度5.1m处的水平位移
Figure 8. Horizontal displacement at depth 5.1m of left artificial boundary from soil-structure interaction and free field analyses
图 9 自由场应力方法和自由场位移方法的计算结果
Figure 9. Results of the free field stress and displacement methods
图 10 左侧人工边界深度5.1m处水平位移频谱(自由场应力法和自由场位移法)
Figure 10. Horizontal displacement spectrum at depth 5.1m of left artificial boundary based on the free field stress and displacement methods
图 12 左侧人工边界深度5.1m处水平位移频谱(侧边界自由方法)
Figure 12. Horizontal displacements spectrum at depth 5.1m of left artificial boundary based on the free lateral boundary method
表 1 场地的几何及材料常数
Table 1. Geometry and material constants of the site
土层 深度/m 密度/kg·m-3 弹性模量/MPa 泊松比 1 0—1.0 1900 99.3 0.333 2 1.0—5.1 1900 110.0 0.488 3 5.1—8.3 1900 164.0 0.493 4 8.3—11.5 1900 204.0 0.494 5 11.5—17.3 1900 326.0 0.490 6 17.3—39.3 2000 648.0 0.487 7 39.3—∞ 2100 1540.0 0.470 
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表 2 黏弹性边界的常数
Table 2. Constants of the viscous-spring boundary
参考文献 边界法向均布弹簧常数 边界切向均布弹簧常数 边界法向均布阻尼常数 边界切向均布阻尼常数 刘晶波等,2005a $\frac{2G}{r}$ $\frac{3G}{2r}$ $\rho {{c}_{\text{P}}}$ $\rho {{c}_{\text{S}}}$ 杜修力等,2006a $\frac{\lambda +2G}{3.6r}$ $\frac{G}{3.6r}$ $1.1\rho {{c}_{\text{P}}}$ $1.1\rho {{c}_{\text{S}}}$
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包锐, 周叮, 刘伟庆等, 2013.粘弹性人工边界及其在盆地地震效应研究中的应用.世界地震工程, 29(4):133-140. http://www.cnki.com.cn/Article/CJFDTOTAL-SJDC201304021.htm 陈灯红, 杜成斌, 苑举卫, 2010.基于ABAQUS的粘弹性边界单元及在重力坝抗震分析中的应用.世界地震工程, 26(3):127-132. http://www.cnki.com.cn/Article/CJFDTOTAL-SJDC201003021.htm 杜修力, 2000.局部解耦的时域波分析方法.世界地震工程, 16(3):22-26. http://www.cnki.com.cn/Article/CJFDTOTAL-SJDC200003005.htm 杜修力, 赵密, 王进廷, 2006a.近场波动模拟的人工应力边界条件.力学学报, 38(1):49-56. http://youxian.cnki.com.cn/yxdetail.aspx?filename=LXXB20170818000&dbname=CAPJ2015 杜修力, 赵密, 2006b.基于黏弹性边界的拱坝地震反应分析方法.水利学报, 37(9):1063-1069. http://www.cnki.com.cn/Article/CJFDTOTAL-SLXB200609005.htm 杜修力, 2009.工程波动理论与方法.北京:科学出版社, 1-444. 廖振鹏, 2002.工程波动理论导论.2版.北京:科学出版社, 1-298. 刘晶波, 吕彦东, 1998.结构-地基动力相互作用问题分析的一种直接方法.土木工程学报, 31(3):55-64. http://www.cnki.com.cn/Article/CJFDTOTAL-TMGC199803008.htm 刘晶波, 王振宇, 杜修力等, 2005a.波动问题中的三维时域粘弹性人工边界.工程力学, 22(6):46-51. http://youxian.cnki.com.cn/yxdetail.aspx?filename=LXXB20170818000&dbname=CAPJ2015 刘晶波, 李彬, 2005b.三维黏弹性静-动力统一人工边界.中国科学E辑工程科学材料科学, 35(9):966-980. http://www.cnki.com.cn/Article/CJFDTOTAL-JEXK200509008.htm 张楚汉, 2001.混凝土坝-地基-库水系统的数值模拟.北京:清华大学出版社. 赵密, 杜修力, 刘晶波, 2012.一种高阶精度人工边界条件:出平面外域波动问题.工程力学, 29(4):7-14. http://www.cnki.com.cn/Article/CJFDTOTAL-GCLX201204004.htm Bermúdez A., Hervella-Nieto L., Prieto A., et al., 2010. Perfectly matched layers for time-harmonic second order elliptic problems. Archives of Computational Methods in Engineering, 17(1):77-107. doi: 10.1007/s11831-010-9041-6 Deeks A., Randolph M., 1994. Axisymmetric dynamic time-domain transmitting boundaries. Journal of Engineering Mechanics, 120(1):25-42. doi: 10.1061/(ASCE)0733-9399(1994)120:1(25) Du X. L., Zhao M., 2010a. A local time-domain transmitting boundary for simulating cylindrical elastic wave propagation in infinite media. Soil Dynamics and Earthquake Engineering, 30(10):937-946. doi: 10.1016/j.soildyn.2010.04.004 Du X. L., Zhao M., 2010b. Stability and identification for rational approximation of frequency response function of unbounded soil. Earthquake Engineering & Structural Dynamics, 39(2):165-186. http://www.iitk.ac.in/nicee/wcee/article/14_14-0292.PDF Givoli D., 2004. High-order local non-reflecting boundary conditions:a review. Wave Motion, 39(4):319-326. doi: 10.1016/j.wavemoti.2003.12.004 Liao Z. P., Wong H. L., 1984. A transmitting boundary for the numerical simulation of elastic wave propagation. International Journal of Soil Dynamics and Earthquake Engineering, 3(4):174-183. doi: 10.1016/0261-7277(84)90033-0 Lysmer J., Kuhlemeyer R. L., 1969. Finite dynamic model for infinite media. Journal of the Engineering Mechanics Division, 95(4):859-878. Wolf J. P., 1985. Dynamic soil-structure interaction. New Jersey:Prentice-Hall. Wolf J. P., 1988. Soil-structure-interaction analysis in time domain. New Jersey:Prentice-Hall. Wolf J. P., 2003. The scaled boundary finite element method. New York:John Wiley & Sons Inc. Zhao C. B., 2009. Dynamic and transient infinite elements:theory and geophysical, geotechnical and geoenvironmental applications. Berlin Heidelberg:Springer. Zhao M., Du X. L., Liu J. B., et al., 2011. Explicit finite element artificial boundary scheme for transient scalar waves in two-dimensional unbounded waveguide. International Journal for Numerical Methods in Engineering, 87(11):1074-1104. doi: 10.1002/nme.3147 -
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