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Dynamic multilevel multiscale simulation of flow in porous media

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Presentation on theme: "Dynamic multilevel multiscale simulation of flow in porous media"— Presentation transcript:

1 Dynamic multilevel multiscale simulation of flow in porous media
DCSE kick-off event 23rd May 2017 M. Cusini, M. Tene, S. Bosma, M. HosseiniMehr, H. Hajibeygi

2 Growing demand for… Accurate simulations of flow in porous media
Hydrocarbon production Geothermal energy production CO 2 sequestration

3 Flow in porous media Governing equations…

4 Flow in porous media It’s a challenging problem because of
Heterogeneities Complex fluid physics SPE 10 Test Case, M. A. Christie & M. J. Blunt, SPE 66599 news.mit.edu/

5 Why multilevel multiscale methods?
Fine-scale discrete system Expensive to solve!

6 Why multilevel multiscale methods?
Fine-scale discrete system What would we like to have? Expensive to solve! 1. Solve smaller system 2. Prolong to approximate fine-scale solution

7 Why multilevel multiscale methods?
Upscaling rock/fluid parameters No scale separation Loss of fine-scale information

8 Why multilevel multiscale methods?
Upscaling rock/fluid parameters No scale separation Loss of fine-scale information

9 Why multilevel multiscale methods?
Upscaling rock/fluid parameters No scale separation Loss of fine scale information Multiscale methods 2 levels Only pressure equation Consistent mapping of equations Efficient solving MSFE/V: Hou & Wu, 97, Efendiev 00, Jenny et al. 03,... i-MSFV: Hajibeygi et al. 08, Wang et al. 14, Tene et al. 15

10 Multiscale in a nutshell
Fine grid: 44x44 Coarse grid: 4x4 Fine-scale numerical solution ( ) MSFV solution ( )

11 Multiscale in a nutshell
Basis functions: (Hou and Wu, JCP 97: MSFE) (Jenny, Lee, Tchelepi, JCP 2003: MSFV) Coarse grid: 4x4 MSFV solution ( )

12 Let’s push MS further Algebraic Dynamic Multilevel (ADM) method
Cusini et al., JCP, 2016

13 Let’s push MS further Algebraic Dynamic Multilevel (ADM) method
n levels Cusini et al., JCP, 2016

14 Let’s push MS further Algebraic Dynamic Multilevel (ADM) method
n levels All unknowns (i.e., p, S, x, …) Cusini et al., JCP, 2016

15 Key features of ADM Needed: Space-time-physics dynamic multiscale multilevel method Accurate: consistent mapping between levels for all unknowns Robust: all couplings, physics Smart: integrable, advanced architectures (parallel, ..., cloud,...)

16 Key features of ADM Needed: Space-time-physics dynamic multiscale multilevel method Accurate: consistent mapping between levels for all unknowns Robust: all couplings, physics Smart: integrable, advanced architectures (parallel, ..., cloud,...)

17 Key features of ADM Needed: Space-time-physics dynamic multiscale multilevel method Accurate: consistent mapping between levels for all unknowns Robust: all couplings, physics Smart: integrable, advanced architectures (parallel, ..., cloud,...)

18 Things can get even nastier…

19 Multiscale methods for fractured media
EDFM DFM Tene et al., JCP, 2016

20 Grazie per l’attenzione!
Thank you for your attention!

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