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All Bent Out of Shape: The Dynamics of Thin Viscous Sheets

All Bent Out of Shape: The Dynamics of Thin Viscous Sheets. Neil M. Ribe Institut de Physique du Globe, Paris. In collaboration with:. D. Bonn (U. of Amsterdam) M. Habibi (IASBS, Zanjan, Iran) M. Maleki (IASBS) H. Huppert (U. of Cambridge) M. Hallworth (U. of Cambridge)

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All Bent Out of Shape: The Dynamics of Thin Viscous Sheets

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  1. All Bent Out of Shape: The Dynamics of Thin Viscous Sheets Neil M. Ribe Institut de Physique du Globe, Paris In collaboration with: D. Bonn(U. of Amsterdam) M. Habibi(IASBS, Zanjan, Iran) M. Maleki(IASBS) H. Huppert(U. of Cambridge) M. Hallworth(U. of Cambridge) J. Dervaux(U. of Paris-7) E. Wertz(U. of Paris-7) E. Stutzmann(IPGP) Y. Ren(IPGP) N. Loubet(IPGP) Y. Gamblin(IPGP) R. Van der Hilst(MIT) Photo courtesy of Mars, Inc.

  2. Analog experiments on subduction (Roma-III): Modeling Earth’s lithosphere as a thin sheet

  3. 1. Stretching : Stress resultant : { { Trouton viscosity rate of stretching 2. Bending : Bending moment : { { viscous flexural rigidity rate of change of curvature Thin viscous sheets: two modes of deformation

  4. Pure bending Pure stretching Rule of thumb: Loaded viscous sheets: bending vs. stretching Partitioning depends on: (1) sheet shape (curvature) (2) loading distribution (3) edge conditions Example:periodic normal loading (no edges)

  5. length scales that are intermediate between the sheet’s thickness and its lateral dimension • normally loaded spherical or cylindrical sheets :  periodic buckling instabilities : stretching/bending transition occurs at load wavelength Intermediate length scales in viscous sheet dynamics Competition of bending and stretching Examples :

  6. An analogous system: coiling of a viscous « rope » • folding sheets contract in the transverse direction : edge-on view: side view: Why coiling is simpler than folding:  folding is inherently unsteady

  7. Experimental setup

  8. 1 cm Multistable coiling

  9. Coiling frequency vs. height: Experimental observations

  10. 17 variables: coordinates of axis Euler parameters curvatures of axis axial velocity spin about axis stress resultant vector bending moment vector 2 unknown parameters: coiling frequency filament length  17th-order nonlinear boundary value problem Steady coiling: mathematical formulation (Ribe 2004, Proc. R. Soc. Lond. A) 17 governing equations(3 force balance; 3 torque balance; 7 geometric; 4 constitutive relations) 19 boundary conditions  Numerical method:continuation(AUTO 97; Doedel et al. 2002)

  11. Coiling frequency vs. height: Experimental observations

  12. Comparison with numerical solutions

  13. « Pendulum » modes; 3 2 n=1 (Mahadevan et al., Nature 2000; Ribe, Proc. R. Soc. Lond. 2004; Maleki et al., Phys. Rev. Lett. 2004; Ribe et al., J. Fluid Mech. 2006; Ribe et al., Phys. Fluids 2006) Coiling frequency vs. height: Four regimes

  14. Force balance: viscous gravity forces Viscous stress resultant: stretching bending Evolution equations for the sheet’s shape: Slow deformation of thin viscous sheets: governing equations (2D)

  15. Development of a buckling instability (numerical simulation; Ribe, J. Fluid Mech. 2002) extension compression bending

  16. Frequency vs. height : Mode 1 First two « pendulum » modes : Mode 2 Multivalued folding

  17. Mode Amplitude d Numerical simulation Viscous (V) Gravitational (G) (Skorobogatiy & Mahadevan 2000) Two modes of slow (inertia-free) folding

  18. Folding amplitude: Universal scaling law (Ribe, Phys. Rev. E 2003) 1.fold amplitude: 2. stretching in the tail: V G 20 40 Composite scaling law:

  19. Scaling law for folding amplitude: Experimental verification  6.5 cm  Guillou-Frottier et al. 1995

  20. Scaling law for folding amplitude: Experimental verification  6.5 cm  Guillou-Frottier et al. 1995 error: 2%

  21. Japan Central America Izu Bonin Indonesia Earth’s Surface Fiji-Tonga • CMB ~2890 km depth Tomographic images of subducted slabs Albarède and van der Hilst, Phil. Trans. R. Soc. Lond. A, 2002

  22. Case study : Central America Regional seismic tomography: (Ren et al. 2006) 660 Predicted folding amplitude:

  23. Central America : predicted fold amplitude vs. observed width of tomographic anomalies (Ribe et al., EPSL 2007)

  24. Parameters : Numerical model of buckling with rollback Buckling frequency vs. rollback speed Buckling ceases when  Effect of trench rollback on buckling

  25. Seismic observations of folding (?) beneath Central America Experimental setup (IPGP) (Hutko et al. 2006) Folding of subducted lithosphere at the CMB?

  26. Limit 1: High viscosity contrast Rescaled folding frequencies: 1 cm Folding is unaffected by the ambient fluid

  27. Limit 2: Low viscosity contrast edge-on view: from above: side view: 4 cm 1 cm +folding suppressed + small-amplitude waves propagate downward

  28. see also poster of G. Morra et al.  two coupled Fredholm integral equations for u(x) on the contours C1 and C2: slab buoyancy restoring force on topography } double-layer integrals • Closely matches typical experimental configurations (e.g. Roma-III) Boundary-integral formulation for free subduction Advantages:  Reduction of dimensionality (3D  2D or 2D  1D)  True free surface  No wall effects (unless desired)  Accurate interface tracking

  29. surface tension force (?) Laboratory experiments: lubrication force buoyant restoring force Numerical model: What holds the plate up?

  30. Example: 2D sheet subducting in a fluid half-space Horizontal velocity of the free surface:

  31. Systematics : plate speed vs. slab dip and viscosity contrast

  32. Work in Progress Extension of the numerical approach to :  3D flow  Mantle viscosity stratification Predictive scaling laws for key subduction parameters :  Plate speed  Trench rollback speed  Point of transition to back-arc extension  State of stress in the slab  Slab morphology (incl. buckling instabilities) Comparison with laboratory experiments (Roma-III)

  33. Physical criterion for onset of buckling Principle:(a) compression is required to amplify shape perturbations (Taylor 1968) (b) growth rate of perturbations must exceed thickening rate Experimental observation: Onset of buckling depends only on geometry, independently of viscosity n and thickening rate D Mathematical analysis: (1) Torque balance in the absence of body forces: (2) Eigensolution for clamped ends: (3) Growth rate l exceeds thickening rate D if

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