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Liquid C rystal C olloids: F unctionalization of I nclusions and C ontinuum

Liquid C rystal C olloids: F unctionalization of I nclusions and C ontinuum. M. Ravnik 1,2 , I. Musevic 3,2 , J. M. Yeomans 1 , S. Zumer 2,3 1 University of Oxford, Oxford, UK 2 University of Ljubljana, Ljubljana, SI 3 Josef Stefan Institute, Ljubljana, SI.

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Liquid C rystal C olloids: F unctionalization of I nclusions and C ontinuum

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  1. Liquid Crystal Colloids: Functionalization of Inclusions and Continuum M. Ravnik1,2, I. Musevic3,2, J. M. Yeomans1, S. Zumer2,3 1 University of Oxford, Oxford, UK 2 University of Ljubljana, Ljubljana, SI 3 Josef Stefan Institute, Ljubljana, SI Support of the EC under the Marie Curie project ACTOIDS is acknowledged. The contents reflect only the author’s views and not the views of the EC.

  2. Outline @ introduction @ theory and modeling @ functionalization of inclusions: role of shape, Janus surface anchoring profile, topological charge, surface structure @ functionalization of continuum: material activity and confinement @ conclusion

  3. Introduction - Colloids:Assembly Various types of materials and (self)assembly: Droplets:Phase separation Droplets:Surface trapping P. Poulin, et al, Science 275, 1770 (1997) A.B. Nych, et al, PRL 98, 057801(2007) J.-C. Loudet, et al, Nature407, 611(2000) Solid beads:Optical tweezers Solid beads:Electrophoresis M.Yada, et al, PRL 92, 185501(2004) O. P. Pishnyak, et al, PRL 99, 127802 (2007) I. Musevic, et al, Science313, 954 (2006)

  4. Introduction - Nematodynamics & Activity Copeland& Weibel, SoftM Matter 2009 Materials have internal motility (e.g. swarms of bacteria): - Nematodynamics NLC colloids in flow; Stark et al PRE 2001 Kibble mechanism; Defect dynamics - Active nematodynamics Dombrowski et al, PRL 2004 Dreyfus et al, Nature 2005 Design flow states Bio-patterns

  5. order elasticity surface Theory + Modelling1/3 5 degrees of freedom: director, degree of order, secondary director, biaxallity Order parameter tensor: I. Equilibrium physics of static NLC Landau – de Gennes phenomenological free energy Numerical relaxation on cubic mesh: Ravnik & Zumer, Liq. Cryst. (2009)

  6. order Theory + Modelling2/3 II. Nematodynamics + Activity Hybrid Lattice Boltzman algorthm: finite differences for Q dynamics and LB for Navier-Stokes flow dynamics. molecular field LC alignment in flow (tumbling/aligning) Material derivative activity viscosity possible compressibility Stress tensor LB scheme: Distribution functions fi: Streaming and collision: D3Q15 scheme Denniston et al, Phil. Trans 362, 1745 (2004)

  7. Theory + Modelling3/3 Numerical parameters and characteristics: coupled cubic mesh (10nm and 100nm) parallel multi-thread computer code typical number of mesh points: few 100 x few 100 x few 100 = few 107(max: 600 x 600 x 600 = 2 x 108) basic parameter values: xN = 6.63nm, Sbulk=0.533, strong surf. anchor. Nematodynamics vs equilibrium static nematic: - memory requirements increase by ~ 10x - evaluation time increses by ~10-100x ; (for equal number of evaluation steps) - crucial coupling of LC and LB time scale (stability) - activity is effectively introduced by single phenomenological parameter in stress tensor (can be switched-off to yield passive nematodynamics)

  8. Particle shape - ellipsoids Ellipsoidal particels can break symmetry of the director: parallel inclination anti-parallel inclination

  9. Janus particles 1/2 Functionalization of particles by surface anchoring design - Gold deposition - planar anchoring - DMOAP hometropic sufactant Crossed polars Opt. microsc. Retardation plate

  10. Janus particles 2/2 Bistability in (meta)stable particle orientations bistability Wp = Wh = 10 -2 J/m2 Wp = 10 -2 J/m2 Wh = 10 -5 J/m2 Energy minima can be tuned by relative surface anchoring strengths. Possible application: light shutter

  11. “Higher-order” Janus particles Particles with homeotropic/planar surface patches: Structure: tiles of director corresponding to relevant surface patches Controllable torques and equilibrium orientation

  12. Topological charge 2 particles 1/2 By generalizing topological anchoring profile, spherical particles with higher-than-one topological charge can be designed: topological charge = 2

  13. Topological charge 2 particles 2/2 Two possible compensations: two -1/2 defect loops single -1/2 “cage-loop” Bonus: director is analyticaly given at the particle surface hence it changes can be analytically followed along the full loop.

  14. Tuning interparticle potential Elastic dipoles and quadrupoles I. Particle shape / director symmetry fit for W = 10-2 J/m2: n = 2.02 fit for W = 10-2 J/m2: n = 2.1 II. Confinement

  15. Active flow in confined cell 1/2 planar anchoring material flow ACTIVITY Active flow profiles in planar nematic cell with thickness of 2 mm. 2D in-plane flow profiles: z = 0.2 z = 0.3 z = 0.4 Activity

  16. Active flow in confined cell 2/2 3D flow profiles are found. z = 0.001z = 0.01z = 0.1 inplane helical Activity Flow can be steared by designing 3D profile of nematic director. Alternatively, orientation can be controlled by imposing flow profile. --> full backflow coupling between Q and u.

  17. 100 nm Active liquid crystal colloids Mechanisms for stearing material flow via backflow coupling: In-situ assembly of microfluidic elements:

  18. Conclusions Functionalization of particles: shape, surface anchoring, surface profile, topological charge Functionalization of bulk: activity, flow stearing, confinement, colloids Future work: dynamics and photonics of colloidal structures, active materials.

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