水力压裂
断裂(地质)
水准点(测量)
代表(政治)
有限元法
有限体积法
领域(数学分析)
领域(数学)
位移场
流离失所(心理学)
断裂力学
机械
流量(数学)
计算机科学
地质学
几何学
结构工程
数学
岩土工程
数学分析
工程类
物理
心理学
大地测量学
政治
政治学
纯数学
法学
心理治疗师
作者
André Nathan Costa,Matteo Cusini,Tao Jin,Randolph R. Settgast,J Dolbow
出处
期刊:Cornell University - arXiv
日期:2022-01-01
被引量:1
标识
DOI:10.48550/arxiv.2207.00661
摘要
We present a multi-resolution approach for constructing model-based simulations of hydraulic fracturing, wherein flow through porous media is coupled with fluid-driven fracture. The approach consists of a hybrid scheme that couples a discrete crack representation in a global domain to a phase-field representation in a local subdomain near the crack tip. The multi-resolution approach addresses issues such as the computational expense of accurate hydraulic fracture simulations and the difficulties associated with reconstructing crack apertures from diffuse fracture representations. In the global domain, a coupled system of equations for displacements and pressures is considered. The crack geometry is assumed to be fixed and the displacement field is enriched with discontinuous functions. Around the crack tips in the local subdomains, phase-field sub-problems are instantiated on the fly to propagate fractures in arbitrary, mesh independent directions. The governing equations and fields in the global and local domains are approximated using a combination of finite-volume and finite element discretizations. The efficacy of the method is illustrated through various benchmark problems in hydraulic fracturing, as well as a new study of fluid-driven crack growth around a stiff inclusion.
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