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Umbilic Lines in Orientational Order

Ordered materials—including magnets, superfluids, Bose condensates, and liquid crystals—display complex three-dimensional structures that are central to modern developments in novel metamaterials, fluid photonics, and ultralow-current spintronics. A common theme in these structures is their geometrical and topological properties, an understanding of which is key to unlocking potential applications. Here, we provide a thorough geometric analysis of orientational order and show how it identifies the topology in complex three-dimensional fields.

 

Materials described by orientational order contain linelike geometrical features such as cores of vortices, lambda lines in cholesterics, and Skyrmions in chiral magnets. We show that such lines can be identified as a set of natural geometric singularities in a unit vector field, the generalization of the umbilic points of a surface, and that they encode the topology of the order. We illustrate the relationship between geometry and topology for a series of examples from modern experiments on Skyrmions and solitons in liquid crystals and chiral ferromagnets. In three dimensions, umbilic lines may become twisted and entangled, and these geometric singularities can form loops whose linking conveys more subtle topological information about the order, which we relate to helicity and Chern-Simons theory. Our work provides a precise geometric and topological characterization of orientational order, clarifies the structures seen in recent experiments, and presents a set of tools to develop and understand ordered media.

 

We expect that our theoretical framework will motivate new experiments exploring the linking and twisting of umbilic loops.

Wed 11 May 2016, 09:59 | Tags: Research