贾晓峰
开通时间:..
最后更新时间:..
点击次数:
摘要:An element-free method (EFM) has been demonstrated successfully in elasticity, heat conduction and fatigue crack growth problems. We present the theory of EFM and its numerical applications in seismic modelling and reverse time migration (RTM). Compared with the finite difference method and the finite element method, the EFM has unique advantages: (1) independence of grids in computation and (2) lower expense and more flexibility (because only the information of the nodes and the boundary of the concerned area is required). However, in EFM, due to improper computation and storage of some large sparse matrices, such as the mass matrix and the stiffness matrix, the method is difficult to apply to seismic modelling and RTM for a large velocity model. To solve the problem of storage and computation efficiency, we propose a concept of Gauss points partition and utilise the graphics processing unit to improve the computational efficiency. We employ the compressed sparse row format to compress the intermediate large sparse matrices and attempt to simplify the operations by solving the linear equations with CULA solver. To improve the computation efficiency further, we introduce the concept of the lumped mass matrix. Numerical experiments indicate that the proposed method is accurate and more efficient than the regular EFM.
是否译文:否
上一条:Ye Lin, Haijiang Zhang(*) and Xiaofeng Jia, 2018, Target-oriented imaging of hydraulic fractures by applying the staining algorithm for downhole microseismic migration, Journal of Applied Geophysics, 150: 278-283.
下一条:Congcong Yuan, Xiaofeng Jia(*), Shishuo Liu and Jie Zhang, 2018, Microseismic reverse time migration with a multi-cross-correlation staining algorithm for fracture imaging, Journal of Applied Geophysics, 149: 95-104.