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Southern Workshop on Granular Materials Puc ón, Chile 10-13 December 2003. Patterns in a vertically oscillated granular layer: (1) lattice dynamics and melting, (2) noise-driven hydrodynamic modes, (3) harvesting large particles. Experiments Dan Goldman (now Berkeley)
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Southern Workshop on Granular Materials Pucón, Chile 10-13 December 2003 Patterns in a verticallyoscillated granular layer: (1) lattice dynamics and melting, (2) noise-driven hydrodynamic modes, (3) harvesting large particles • Experiments • Dan Goldman(now Berkeley) • Mark Shattuck (now City U. New York) Harry Swinney University of Texas at Austin • Simulations • Sung Jung Moon (now Princeton) • Jack Swift
Particles in a vertically oscillating container light f = frequency(10-200 Hz) = (acceleration amplitude)/g = 42f2/g(2-8)
Square pattern f = 23 Hz acceleration = 2.6g Particles: bronze, d=0.16 mm layer depth = 3d 1000d
peak OSCILLONS • localized • oscillatory: f /2 • nonpropagating • stable crater Umbanhowar, Melo, & Swinney, Nature (1996)
Oscillons: building blocks for moleculeseach molecule is shown in its two opposite phases dimer tetramer polymer chain
Oscillons:building blocks of a granular lattice? each oscillon consists of 100-1000 particles
Dynamics of a granular lattice time evolution snapshot: close up snapshot 18 cm Goldman, Shattuck, Moon, Swift, Swinney, Phys. Rev. Lett. 90 (2003) G = 2.90, f = 25 Hz, lattice oscillation 1.4 Hz
Coarse-graining of granular lattice: A lattice of balls connected by Hooke’s law springs? Then the dispersion relation would be: frequency at edge of Brillouin zone wherek is wavenumber and a is lattice spacing
Compare measured dispersion relation with lattice model From space-time FFT I(kx,ky,fL) fLattice (Hz) lattice model kBrillouin Zone (for (1,1)T modes) G = 2.75
DEFECTS apply FM 52 cycles later 235 cycles later FFT FFT FFT Create defects: make lattice oscillations large Resonant modulation: FM at lattice frequency: modulation rate = 2 Hz container position: 32 Hz G = 2.9
Frequency modulate the container, andadd graphite to reduce friction MELTING add graphite by 175 cycles:melted 56 cycles later G = 2.9, f = 32 Hz, fmr(FM) = 2 Hz
m = 0.5 m= 0 100 cycles later: melted 22 cycles later MD simulation: reduce friction to zerocrystal melts (without adding frequency modulation) G = 3.0, f = 30 Hz
Lindemann criterion for crystal melting Lindemann ratio: where um and un are displacements from the lattice positions of nearest neighbor pairs, and a is the lattice constant. Simulations of 2-dimensional lattices in equilibrium show lattice melting when Bedanov, Gadiyak, & Lozovik , Phys Lett A (1985) Zheng & Earnshaw, Europhys Lett (1998)
Test Lindemann criterion on granular latticeMD simulations g m = 0.1 melting threshhold lattice melts Lindemann criterion m = 0.5: no melting Goldman, Shattuck, Moon, Swift, Swinney, Phys. Rev. Lett. 90 (2003)
Conclude: granular lattice is described well by discrete lattice picture.How about a continuum description? • Granular patterns: as in continuum systems -- vertically oscillated liquids, liquid crystals, … --- squares, stripes, hexagons, spiral defect chaos • Instabilities as in Rayleigh-Bénard convection --- skew-varicose, cross-roll
Spiral defect chaos Rayleigh-Bénard convection Granular oscillating layer Plapp and Bodenschatz Physica Scripta (1996) deBruyn, Lewis, and Swinney Phys. Rev. E (2001)
Skew-varicose instabililty observed in granular expt:same properties as skew-varicose instability of Rayleigh-Bénard convection rolls 2 1 deBruyn et al., Phys. Rev. Lett. (1998) 3 4 wavelength increases
Cross-roll instabilityobserved in granular experiment:same properties as cross-roll instability in convection wave- length decreases de Bruyn, Bizon, Shattuck, Goldman, Swift, and Swinney, Phys. Rev. Lett. (1998)
Continuum models of granular patterns • Tsimring and Aranson, Phys. Rev. Lett. (1997) • Shinbrot, Nature (1997) • Cerda, Melo, & Rica, Phys. Rev. Lett. (1997) • Sakaguchi and Brand, Phys. Rev. E (1997) • Eggers and Riecke, Phys. Rev. E (1998) • Rothman, Phys. Rev. E (1998) • Venkataramani and Ott, Phys. Rev. Lett. (1998)
Convecting fluids:thermal fluctuations drive noisy hydrodynamic modes below the onset of convection Theory: Swift-Hohenberg eq., derived from Navier-Stokes Swift & Hohenberg, Phys Rev A (1977) Hohenberg & Swift, Phys Rev A (1992) Experiments: convecting fluids and liquid crystals: Rehberg et al., Phys Rev Lett (1991) Wu, Ahlers, & Cannell, Phys Rev Lett (1995) Agez et al., Phys Rev A (2002) Oh & Ahlers, Phys. Rev. Lett. (2003) Granular systems are noisy. Can hydrodynamic modes be seen below the onset of patterns?
G = 2.6, f = 30 Hz Noise below onset of granular patterns snapshot time evolution time (T) 6.2 cm x 170 mm stainless steel balls (e 0.98)
P(f) S(kx,ky) Increase G towardpattern onset at Gc = 2.63 :Smax(k) increases |k| 0 15 30 45 60 Hz
Emergence of square pattern with long-range order G = 2.8 S(kx,ky) P(f) frequency of square pattern container frequency S(k) k
Swift-Hohenberg model for convection:from Navier-Stokes eq. with added noise If no noise (F = 0) (“mean field”), pattern onset is at But if F 0, onset of long-range (LR) order is delayed, Xi, Vinals, Gunton, Physica A (1991); Hohenberg & Swift, Phys Rev A (1992)
Compare granular experiment to Swift-Hohenberg model Goldman, Swift, & Swinney Phys. Rev. Lett. (Jan. 2004) Experiment SQUARES e = (G – Gc)/Gc DISORDERED Granular noise is: -- 104 times the kBT noise in Rayleigh-Bénard convection [Wu, Ahlers, & Cannell, Phys. Rev. Lett. (1995)] --10 times the kBT noise in Rayleigh-Bénard convection near Tc [Oh & Ahlers, Phys. Rev. Lett. (2003)] e Swift-Hohenberg
Kink: boundary between regions of opposite phase --layer on one side of kink moves down while other side moves up flat with kinks OSCILLONS f* = f x [(layer depth)/g]1/2
kink Kink: a phase discontinuity3-dimensional MD simulation G =6.5 x/d container 0 100 200 x/d Moon, Shattuck, Bizon, Goldman, Swift, Swinney Phys. Rev. E65, 011301 (2001)
Convection toward a kink This is NOT a snapshot: the small black arrows show the displacement of a particle in 2 periods (2/f ) rising falling
Larger particles rise to top (Brazil nut effect)and are swept by convection to the kink glass particles dia. = 4d bronze particles dia. = d • this segregation is intrinsic to the dynamics(not driven by air or wall interaction)
kink oscillating kink t = 0 EXPERIMENT:controlled motion ofthe kink harveststhe larger particles particle trajectory black glass dia. = 4d bronze d = 0.17 mm Moon, Goldman, Swift, Swinney, Phys. Rev. Lett. 91 (2003) 247 cycles 566 cycles
Dynamics of a granular lattice • Granular lattice: like an equilibrium lattice of harmonically coupled balls and springs • Lindemann melting criterion supports the coupled lattice picture • Question: • Would continuum pattern forming systems, e.g., • Faraday waves in oscillating liquid layers, • Rayleigh-Bénard convection patterns, • falling liquid columns, • Taylor-Couette flow, • viscous film fingers, … • exhibit similar lattice dispersion and melting phenomena?
Noise Near the onset of granular patterns, noise drives hydrodynamic-like modes, which are well described by the Swift-Hohenberg equation.
Harvesting large particles Segregation of bi-disperse mixtures has been achieved for particles with • Diameter ratios: 1.1 – 12 • Mass ratios: 0.4 - 2500
