Multiscale Simulation Framework for Coupled Fluid Flow and Mechanical Deformation | |
Hou, Thomas1  Efendiev, Yalchin2  Tchelepi, Hamdi3  Durlofsky, Louis2  | |
[1] California Inst. of Technology (CalTech), Pasadena, CA (United States);Stanford Univ., CA (United States);Texas A & M Univ., College Station, TX (United States) | |
关键词: multiscale; porous media; upscaling; multiscale finite element; multiscale finite volume.; | |
DOI : 10.2172/1254120 RP-ID : FG02--06ER25725, FG02--06ER25726, FG02--06ER25727 PID : OSTI ID: 1254120 |
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学科分类:数学(综合) | |
美国|英语 | |
来源: SciTech Connect | |
【 摘 要 】
Our work in this project is aimed at making fundamental advances in multiscale methods for flow and transport in highly heterogeneous porous media. The main thrust of this research is to develop a systematic multiscale analysis and efficient coarse-scale models that can capture global effects and extend existing multiscale approaches to problems with additional physics and uncertainties. A key emphasis is on problems without an apparent scale separation. Multiscale solution methods are currently under active investigation for the simulation of subsurface flow in heterogeneous formations. These procedures capture the effects of fine-scale permeability variations through the calculation of specialized coarse-scale basis functions. Most of the multiscale techniques presented to date employ localization approximations in the calculation of these basis functions. For some highly correlated (e.g., channelized) formations, however, global effects are important and these may need to be incorporated into the multiscale basis functions. Other challenging issues facing multiscale simulations are the extension of existing multiscale techniques to problems with additional physics, such as compressibility, capillary effects, etc. In our project, we explore the improvement of multiscale methods through the incorporation of additional (single-phase flow) information and the development of a general multiscale framework for flows in the presence of uncertainties, compressible flow and heterogeneous transport, and geomechanics. We have considered (1) adaptive local-global multiscale methods, (2) multiscale methods for the transport equation, (3) operator-based multiscale methods and solvers, (4) multiscale methods in the presence of uncertainties and applications, (5) multiscale finite element methods for high contrast porous media and their generalizations, and (6) multiscale methods for geomechanics.
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