Amélie Neuville. Advanced Materials and Complex Systems group (AMCS) University of Oslo Norway

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1 Amélie Neuville Advanced Materials and Complex Systems group (AMCS) University of Oslo Norway

2 The Research Council of Norway Postdoc within a PETROMAKS project Mobility grant for young researchers YGGDRASIL, project PICS between Norway and France AMCS Oslo, University of Oslo Eirik Flekkøy Knut Jørgen Måløy Mihailo Jankov Ken Tore Tallakstad Marion Erpelding EOST Strasbourg, University of Strasbourg Renaud Toussaint Jean Schmittbuhl Alain Cochard University of Glasgow Daniel Koehn University of Mainz Olivier Schwarz

3 Photo P Thomas

4 Photo JP Malet

5 Dr M Royon / Wikimedia Commons Image GEIE

7 3 2 1

8 Laser profiler (mm) (mm) Neuville et Al. Hydraulic Processes (2011) (mm)

9 Photogrammetry

10 Computer tomography scan Neuville et Al. Hydraulic Processes (2011)

$Open fracture$ Correlation of the

$fracture 14 12 10 8$

11 (mm) Aperture (mm) Open fracture Correlation of the topography + hypothesis on the type of displacement (normal/shear/ ) (mm) Sealed fracture (mm) Aperture (mm) (mm)

12 Natural aperture Self-affine aperture (mm) (mm) (mm) (mm) (mm)

13 Navier-Stokes V ρ + V. V t Advection-diffusion equation Depend on = p + η V + f ext T +.( VT ) =.( χ T ) t fluid viscosity, density pressure gradient r p η, ρ Rock/fluid thermal diffusivities Fracture aperture a(x,y) χ r, χ f y z x Fluid injection (P 0,T 0 ) T r (t =0) = 200 C a(x,y) T r (t)? Fluid pumping (P L,T f?) Scale: individual fracture

Finite differences (FD) model o Lubrications approximations = Equations averaged across the aperture Smooth roughness (Here: self-affine aperture) Velocity

14 Finite differences (FD) model o Lubrications approximations = Equations averaged across the aperture Smooth roughness (Here: self-affine aperture) Velocity contained in the mean plane (x,y) z V parabolic Diffusive heat flux along z Advectiveheat flux in the mean plane (x,y) z T quartic o Constant rock temperature

15 Rough apertures (self-affine) a( x, y) Main flow 2D-hydraulic flow norm ( x, y ) inertial forces Re = = 0.23 viscous forces q r Averaged temperature T ( x, y) = a V ( x, y, z) T ( x, y, z) dz a V ( x, y, z) dz Neuvilleet Al. Phys. Rev. E(2010) Neuville et Al. C.R. Geosci.(2010)

16 Velocity Temperature

17 Control of the large scales modes on the hydro-thermal variations Fourier filtering of the aperture Neuville et Al. GJI (2011) Aperture y x

18 Control of the large scales modes on the hydro-thermal variations Aperture y x Main flow Hydraulic flow Main flow -ln(t * ) Neuville et Al. GJI (2011)

19 Mean geometrical aperture known Not enough information to model the hydro-thermal behavior Permeability known Thermal exchange efficiency over-estimated if neglecting the roughness Large scale variation of the aperture known Good estimation of the permeability and thermal efficiency

20 Effect of sharp morphology? Full Navier Stokes equation solved in 3D + Natural convection Full advection-diffusion heat equation solved in 3D, in fluid androck Dynamical modeling Transientregime, Morphology evolution

21 Comes from Lattice gas methods Discrete space and time Discrete velocity directions Fictitious particles, 1 particle/node in a given direction Variables: booleans showing particle occupation Boltzmann methods Average in a mesoscopicvolume of particles occupation in a given direction Here: 2 particles distributions, 2 lattices Hydraulics mass particle distribution Conservation of mass and momentum Thermics Internal energy particle distribution Conservation of internal energy and energy flux

22 FLUID ROCK Space unit: average aperture A/20 Time unit: 0.125[A/(40)] 2 x (0.016/χ r ) Reynolds number: 0.17 Péclet number: 46 Temperature unit: arbitrary (fixed by fluid injection temperature and rock temperature) χ /χ r = 0.17 (realistic)

23 Space unit: average aperture A/20 Time unit: 0.125[A/(40)] 2 x (0.016/χ r ) Reynolds number: 0.17 Péclet number: 46 Temperature unit: arbitrary (fixed by fluid injection temperature and rock temperature) χ /χ r = 0.17 (realistic)

24 ROCK FLUID V x V x * V x V z * Recirculation SmallReynolds number (Re 0.17) β=28 β=102 V x * FLUID x10-3 x10-3 V * z z V z z x x V x * V x *

25 Temperature ROCK ROCK FLUID χ f z x * (x) * * Reynolds number: 0.17 Péclet number: 46

26 Temperature * * * (x) Linear fit, exp(-x/r // ) Linear fit, exp(-x/r) Corner: R / R // = 1.7 x ROCK

27 R / R // 1 2 p L 1 2 L β p p=20, L=10, β=28 p=20, L=50, β=?

28 Re = 0.17 Pe = 46

29 Vx Vz

30 Temperature T* Compared to the temperature obtained in FD with lubrication approximation

31 P = P0 + bsin(2π t * P ) = P0 + bsin(2π t * Re = 1.8 ) Vx Vz

32 Temperature (quasi stationnary regime) Re = 1.8 Pe = 201 Temperature difference, without-with time dependent pressure

33 Boussinesq approximation g T v p v v t v r ρ ε η ρ + + = +. Thermal expansion coefficient ε Reynolds number: 0.05 Péclet number: 0.46

34 Vx Velocity Z Vz

35 Possible mechanism to explain frequencies induced by tremor/aseismic events? Stress change

36 t+ t e.g. Cochard et Rice J Mech Phys Solids (1997)

37 Example of stress within the fluid (LB computation) : Shear stress -- dimensionless

38 Radiation Temperature Planck law +corrections

39 Bottom: rough surface: Epoxy plate surface cast Numerical topography: photogrammetry Zone observed withthe IR camera

41 Top surface: transparent to the IR Polyethylen(plastic bag) Germanium plate with anti-reflexion coating

42 Free surface

43 Hydro-thermal Due to the fracture roughness, channeling of Hydraulic flow Temperature (energy) Large scale variations are important Thermal exchange less efficient than flat model with same permeability Inside the asperity with steep slopes: Recirculation Fluid trapped Few advectivethermal exchanges, even with a time dependent pressure

44 Hydro-thermal modeling using LB methods Advantages Full hydraulic and heat equations solved in 3D Fluid recirculation Natural convection Dynamic modelling Direct computation of stress within the fluid Possibility to couple fluid LB simulation with solid and wave modelling Other questions which could be addressed with LB methods: Long term behavior of geothermal systems o Diffusion in the rock and liquid Chemical effects? o Advection-diffusion equation: also holds for the chemical species concentration o Crystallization/dissolution

45 Experimentation with an infrared camera Observation of temperature evolution Experimental setup Feasibility study Observing the temperature of a fluid circulating in a fracture On going / further work Calibration / precision of the setup Thermal and infrared properties of each material in the setup Comparison with numerical simulations Link with field measurements

Amélie Neuville (1,2), Renaud Toussaint (2), Eirik Flekkøy (1), Jean Schmittbuhl (2)

Amélie Neuville (1,2), Renaud Toussaint (2), Eirik Flekkøy (1), Jean Schmittbuhl (2) Thermal exchanges between a hot fractured rock and a cold fluid Deep geothermal systems Enhanced Geothermal Systems