TY - GEN
T1 - A multilevel preconditioner and its shared memory implementation for new generation reservoir simulator
AU - Wang, Baohua
AU - Wu, Shuhong
AU - Li, Qiaoyun
AU - Li, Xiaobo
AU - Li, Hua
AU - Zhang, Chensong
AU - Xu, Jinchao
N1 - Publisher Copyright:
Copyright 2014, Society of Petroleum Engineers.
PY - 2015
Y1 - 2015
N2 - The mathematical models in reservoir simulation are usually discretized into large linear equations, and solving them needs lots of time. Taking into account the mathematical characteristics of the black oil model, a multilevel preconditioning solution method is designed to deal with the algebraic equations in reservoir numerical simulation. Takes into account some of the properties of pressure, saturation, and implicit well variables in flow model, the multilevel preconditioner is comprised of several different iterative methods, such as algebraic multigrid method, Incomplete LU factorization, Gauss-Seidel iteration with downwind ordering and crosswind blocks and et al. The efficiency and robustness of multilevel preconditioner is proved by a million-cell benchmark problem and a real-world matured reservoir with high heterogeneity, high water-cut, geological faults, and complex well scheduling. The numerical results indicate that the proposed method is not only robust with respect to the heterogeneity, anisotropy, and number of wells but also efficient method that can solve large Jacobian system in reservoir simulation quickly and precisely.
AB - The mathematical models in reservoir simulation are usually discretized into large linear equations, and solving them needs lots of time. Taking into account the mathematical characteristics of the black oil model, a multilevel preconditioning solution method is designed to deal with the algebraic equations in reservoir numerical simulation. Takes into account some of the properties of pressure, saturation, and implicit well variables in flow model, the multilevel preconditioner is comprised of several different iterative methods, such as algebraic multigrid method, Incomplete LU factorization, Gauss-Seidel iteration with downwind ordering and crosswind blocks and et al. The efficiency and robustness of multilevel preconditioner is proved by a million-cell benchmark problem and a real-world matured reservoir with high heterogeneity, high water-cut, geological faults, and complex well scheduling. The numerical results indicate that the proposed method is not only robust with respect to the heterogeneity, anisotropy, and number of wells but also efficient method that can solve large Jacobian system in reservoir simulation quickly and precisely.
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M3 - Conference contribution
AN - SCOPUS:84959891208
T3 - SPE Large Scale Computing and Big Data Challenges in Reservoir Simulation Conference and Exhibition 2014
SP - 67
EP - 74
BT - SPE Large Scale Computing and Big Data Challenges in Reservoir Simulation Conference and Exhibition 2014
PB - Society of Petroleum Engineers
T2 - SPE Large Scale Computing and Big Data Challenges in Reservoir Simulation Conference and Exhibition 2014
Y2 - 15 September 2014 through 17 September 2014
ER -