Abstract
Liquid-crystalline ordering in vertically vibrated granular monolayers confined in annuli of different sizes is examined. The annuli consist of circular cavities with a central circular obstruction. In the absence of the central obstruction cylinders of low aspect-ratio exhibit tetratic order, except for the existence of four defects which restore the symmetry broken by the circular confinement. This behaviour is demanded by topology in systems with strong anchoring properties at the surface. By contrast, topology dictates that the annular geometry is compatible with a distorted tetratic phase without point defects. However, the effect of restricted geometry and limited size on phases possessing finite anchoring energy at the wall and elastic stiffness leads to different configurations, showing finite ordered regions separated by domain walls. We argue that highly packed nonequilibrium vibrated granular monolayers respond to geometrical frustration and extreme confinement as corresponding equilibrium systems of particles do, and that the former can be analysed in terms of surface free energies, elastic distortions and defects, much as equilibrium liquid crystals. Therefore, selective confinement of vertically-vibrated monolayers of rods could be used with advantage as a new tool to study the creation and dynamics of various types of defects in ordered systems.
Highlights
The observation that quasi-two-dimensional monolayers of granular spherical particles can be excited by periodic motion, leading to pattern formation, has been investigated in the last decades [1,2,3,4,5,6,7,8,9,10]
The theoretical interpretion of the results presented in the previous section is not easy, since at present there is no theoretical framework available for dense vibrated monolayers of anisotropic granular particles
We can only speculate based on equilibrium concepts and other arguments rooted on dissipation mechanisms
Summary
The observation that quasi-two-dimensional monolayers of granular spherical particles can be excited by periodic motion, leading to pattern formation, has been investigated in the last decades [1,2,3,4,5,6,7,8,9,10]. It has been shown that metallic rods of small aspect ratio may form global tetratic (i.e., fluid monolayers with fourfold orientational order) patterns inside circular cavities [20], along with the presence of what seem to be four point-defected regions, symmetrically located at the corners of a square inscribed in the circle [24,27]. The interpretation of these regions in terms of point topological charges that restore the broken fourfold symmetry of the tetratic director when confined to a circular cavity is appealing. V with a discussion of the results and present some conclusions
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