Flow in porous media with low dimensional fractures by employing enriched Galerkin method

T. Kadeethum, H. M. Nick*, S. Lee, F. Ballarin

*Corresponding author for this work

Research output: Contribution to journalJournal articleResearchpeer-review

35 Downloads (Pure)

Abstract

This paper presents the enriched Galerkin discretization for modeling fluid flow in fractured porous media using the mixed-dimensional approach. The proposed method has been tested against published benchmarks. Since fracture and porous media discontinuities can significantly influence single- and multi-phase fluid flow, the heterogeneous and anisotropic matrix permeability setting is utilized to assess the enriched Galerkin performance in handling the discontinuity within the matrix domain and between the matrix and fracture domains. Our results illustrate that the enriched Galerkin method has the same advantages as the discontinuous Galerkin method; for example, it conserves local and global fluid mass, captures the pressure discontinuity, and provides the optimal error convergence rate. However, the enriched Galerkin method requires much fewer degrees of freedom than the discontinuous Galerkin method in its classical form. The pressure solutions produced by both methods are similar regardless of the conductive or non-conductive fractures or heterogeneity in matrix permeability. This analysis shows that the enriched Galerkin scheme reduces the computational costs while offering the same accuracy as the discontinuous Galerkin so that it can be applied for large-scale flow problems. Furthermore, the results of a time-dependent problem for a three-dimensional geometry reveal the value of correctly capturing the discontinuities as barriers or highly-conductive fractures.

Original languageEnglish
Article number103620
JournalAdvances in Water Resources
Volume142
Number of pages46
ISSN0309-1708
DOIs
Publication statusPublished - Aug 2020

Keywords

  • Enriched Galerkin
  • Finite element method
  • Fractured porous media
  • Heterogeneity
  • Local mass conservative
  • Mixed-dimensional

Cite this