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Paper detail

Forming a cube from a sphere with tetratic order

Composed of square particles, the tetratic phase is characterised by a four-fold symmetry with quasi-long-range orientational order but no translational order. We construct the elastic free energy for tetratics and find a closed form solution for 1/4-disclinations in planar geometry. Applying the same covariant formalism to a sphere we show analytically that within the one elastic constant approximation eight +1/4-disclinations favor positions defining the vertices of a cube. The interplay between defect-defect interactions and bending energy results in a flattening of the sphere towards superspheroids with the symmetry of a cube.

preprint2015arXivOpen access
O. V. ManyuhinaM. J. Bowick
cond-mat.soft
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O. V. ManyuhinaM. J. Bowick

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