|
|
|
| 3D seismic wave field numerical simulation method and its application |
| Wang Jun |
China University of Mining and Technology (Beijing) School of Earth Science and Surveying and
Mapping Engineering ,Beijing 100083, China |
|
|
|
|
Abstract According to the inevitable abrupt boundary truncation in numerical simulation, various boundary conditions for eliminating wave field interference and reflection were discussed. In order to realize 3D seismic wave field imaging, the principle of finite difference method and pseudo spectrum method in three-dimensional elastic wave field was analyzed based on wave theory and corresponding mathematical approximation method, and the idea of programming was introduced. In the example, the cerjan damping absorbing boundary condition and PML perfectly matched layer absorbing boundary condition were applied to the forward modeling of three-dimensional homogeneous medium model; then, in order to further verify the applicability of the forward modeling method in three-dimensional geological conditions, the three-dimensional layered geological body model was used for simulation. By analyzing the results of 3D wave field imaging, more comprehensive and detailed wave field response characteristics can be obtained, and it was helpful to improve the numerical imaging method.
|
|
|
|
|
|
| [ 1 ] 裴正林. 三维各向异性介质中弹性波方程交错网格高阶有限差分法数值模拟[ J ]. 石油大学学报(自然科学版),2004( 5 ):23 - 29.
[ 2 ] 裴正林. 三维各向同性介质弹性波方程交错网格高阶有限差分法模拟[ J ]. 石油物探,2005( 4 ):308 - 315,15.
[ 3 ] 裴正林. 三维双相各向异性介质弹性波方程交错网格高阶有限差分法模拟[ J ]. 中国石油大学学报(自然科学版),2006( 2 ):16 - 20.
[ 4 ] 夏 凡,董良国,马在田. 交错网格高阶差分法三维弹性波数值模拟(英文)[ J ]. Journal of Chinese Geophysical Society Applied Geophysics, 2004( 01 ): 38 - 41,66.
[ 5 ] 王润秋,张 明,费建博,等. 精细积分法三维地震波正演模拟[ J ]. 勘探地球物理进展,2006( 6 ):394 - 397,11.
[ 6 ] 谢桂生,刘 洪,赵连功. 伪谱法地震波正演模拟的多线程并行计算[ J ]. 地球物理学进展,2005( 1 ):17 - 23.
[ 7 ] 杨书博,乔文孝,车小花. 基于MPI和OpenMP的三维弹性波方程混合并行有限差分算法[ J ]. 应用声学,2018,37( 1 ):75 - 82.
[ 8 ] 牟永光,裴正林. 三维复杂介质地震数值模拟[ M ]. 北京:石油工业出版社,2005.
[ 9 ] Charles Cerjan, DanKosloft, RonnieKosloff, and Moshe Reshef. A nonreflecting boundary condition for discrete acoustic and elastic wave equations[ J ]. Geophysics, 1985, 50( 4 ): 705 - 708.
[ 10 ] Boundary conditions for the numerical solution of wave propagation problems. Reynolds A C. Geophysics. 1978.
[ 11 ] Absorbing boundary conditions for acoustic and elastic wave equations. Robert Clayton, BjornEngquist. Bulletin of the Seismological Society of America . 1977, 66( 11 ): 1 529 - 1 540.
[ 12 ] Francis collino, ChrysoulaTsogka. Application of the PML absorbing layermodel to the linear elasto-dymanic problem in anisotropic media[ J ]. Geophysics, 2001, 66( 1 ): 294 - 307.
[ 13 ] 李 飞,程久龙,杨思通. 基于Cerjan衰减函数的PML吸收边界条件[ J ]. 物探与化探,2012,36( 6 ):996 - 1 000.
[ 14 ] 冯英杰,杨长春,吴 萍. 地震波有限差分模拟综述[ J ]. 地球物理学进展,2007( 2 ):487 - 491.
[ 15 ] 王守东. 声波方程完全匹配层吸收边界[ J ]. 石油地球物理物探,2003( 1 ):31 - 34,115 - 112.
[ 16 ] 董良国,马在田,曹景忠. 一阶弹性波方程交错网格高阶差分解法稳定性研究[ J ]. 地球物理学报,2000( 6 ):856 - 864.
[ 17 ] 刘洋楚,李承楚. 双相各向异性介质中弹性波传播伪谱法数值模拟研究[ J ]. 地震学报,2000( 2 ):132 - 138.
[ 18 ] 武 晔,赵晓燕,石砚斌,等. 伪谱算法在声波数值模拟中的数值频散分析[ J ]. 地震,2017,37( 2 ):135 - 146. |
|
|
|
