Wetting as a Macroscopic and Microscropic Process

1. Wetting as a Macroscopic and Microscropic Process J.E. Sprittles (University of Birmingham / Oxford, U.K.) Y.D. Shikhmurzaev (University of Birmingham, U.K.) Seminar at KAUST, February 2012

2. ‘Impact’ A few years after completing my PhD.....

3. Wetting: Statics Wettable (Hydrophilic) Non-Wettable (Hydrophobic)

4. Wetting: Dynamics

5. Capillary Rise 27mm Radius Tube Stangeet al 03 50nm x 900nm Channels Han et al 06 1 Million Orders of Magnitude!!

6. Polymer-Organic LED (P-OLED) Displays

7. Inkjet Printing of P-OLED Displays Microdrop Impact & Spreading

8. Modelling: Why Bother? • - Recover Hidden Information • - Map Regimes of Spreading 3 – Experiment Millimetres in Milliseconds - Riobooet al (2002) Flow Inside Solids – Marston et al 2010 Microns in Microseconds - Dong et al (2002)

9. Dynamic Contact Angle • Required as a boundary condition for the free surface shape. r r t Pasandideh-Fard et al 1996

10. ) U Speed-Angle Formulae Dynamic Contact Angle Formula Young Equation σ1 σ3 - σ2 Assumption: A unique angle for each speed R

11. ) Drop Impact Experiments Bayer & Megaridis 06

12. Capillary Rise Experiments Sobolevet al 01

13. Dynamic Wetting:An Interface Formation Process

14. Physics of Dynamic Wetting Liquid-solid interface Solid Forming interface Formed interface • Make a dry solid wet. • Create a new/fresh liquid-solid interface. • Class of flows with forming interfaces.

15. Relevance of the Young Equation Static situation Dynamic wetting σ1e σ1 θe θd σ3 - σ2 σ3e - σ2e R R Dynamic contact angle results from dynamic surface tensions. Theangle is now determined by the flow field. Slip created by surface tension gradients (Marangoni effect)

16. f (r, t )=0 e1 n n θd e2 Interface Formation Modelling In the bulk: Interface Formation Model On free surfaces: On liquid-solid interfaces: At contact lines:

17. A Finite Element Based Computational Framework JES &YDS 2011, Viscous Flows in Domains with Corners, CMAME JES & YDS 2012, Finite Element Framework for Simulating Dynamic Wetting Flows, Int. J. Num. Meth Fluids. JES & YDS, 2012, Finite Element Simulation of Dynamic Wetting Flows as an Interface Formation Process, to JCP. JES & YDS, 2012, The Dynamics of Liquid Drops and their Interaction with Surfaces of Varying Wettabilities, to PoF.

18. Mesh Resolution Critical

19. Arbitrary LagrangianEulerian Mesh Control

20. Drop Impact

21. Impact at Different Scales Millimetre Drop Microdrop Nanodrop

22. Pyramidal (mm-sized) Drops Experiment of Renardyet al, 03.

23. Microdrop Impact 25 micron water drop impacting at 5m/s on left: wettable substrate right: nonwettable substrate

24. Microdrop Impact Pressure Scale Velocity Scale

25. Microdrop Impact ?

26. Hidden Dynamics

27. Surfaces of Variable Wettability 1 1.5

28. Flow Control on Patterned Surfaces JES & YDS 2012, to PoF

29. Dynamics of Flow Through a Capillary

30. Steady Propagation of a Meniscus

31. Flow Characteristics

32. ‘Hydrodynamic Resist’ Smaller Capillaries

33. Summary: Dynamic Wetting Models Meniscus shape unchanged by dynamic wetting Meniscus shape dependent on speed of propagation. Hydrodynamic Resist: Meniscus shape influenced by geometry Dynamic Dynamic Dynamic Equilibrium Equilibrium Equilibrium Meniscus Washburn Model Basic Dynamic Wetting Models Interface Formation Model and Experiments

34. Capillary Rise: Models vs Experiments • Compare to experiments of Jooset al 90 and conventional Lucas-Washburn theory • Lucas-Washburn assumes: • Poiseuille Flow Throughout • Spherical Cap Meniscus • Fixed (Equilibrium) Contact Angle

35. Lucas-Washburn vs Full Simulation R = 0.074cm; every 50secs R = 0.036cm; every 100secs

36. Comparison to Experiment Washburn Washburn Full Simulation Full Simulation JES & YDS 2012, to JCP

37. Wetting as a Microscopic Process:Flow through Porous Media

38. Problems and Issues

39. Problems and Issues • Micro: Pore scale dynamics of: • Menisci in wetting front • Ganglia • Macro (Darcy-scale) dynamics of: • Entire wetting front • Ganglia in multiphase system • Multi-scale porosity: • Motion on a microporous substrate

40. Physical Reality

41. Continuum Model • Simplest Case First: Full Displacement (no ganglia formation) Kinematic boundary condition Dynamic boundary condition ?

42. Wetting Front: Modes of Motion Threshold mode Wetting mode

43. Some Unexplained Effects ) 1). T. Delker, D. B. Pengra & P.-z. Wong, Phys. Rev. Lett.76, 2902 (1996). g z 2). M. Lago & M. Araujo, J. Colloid & Interf. Sci.234, 35 (2001).

44. Suggested Description ) Non-Washburnian ) z ) g 2/3 of height in 2 mins 1/3 of height in many hours Washburnian

45. Developed Theory ) z g Random Fluctuations ‘Break’ Threshold Mode YDS & JES 2012, JFM; YDS & JES 2012, to PRE

46. Flow over a Porous Substrate

47. Wetting: Micro-Macro Coupling Spreading on a Porous Medium

48. Current State of Modelling • 1) Contact Line Pinned • 2) Shape Fixed as Spherical Cap

49. The Reality Equilibrium shape is history-dependent.

50. Spreading on a Porous Substrate θD θw U θd