English

Smectics: Symmetry Breaking, Singularities, and Surfaces

Soft Condensed Matter 2009-09-14 v3 Statistical Mechanics High Energy Physics - Theory Geometric Topology

Abstract

The homotopy theory of topological defects in ordered media fails to completely characterize systems with broken translational symmetry. We argue that the problem can be understood in terms of the lack of rotational Goldstone modes in such systems and provide an alternate approach that correctly accounts for the interaction between translations and rotations. Dislocations are associated, as usual, with branch points in a phase field, while disclinations arise as critical points and singularities in the phase field. We introduce a three-dimensional model for two-dimensional smectics that clarifies the topology of disclinations and geometrically captures known results without the need for compatibility conditions. Our work suggests natural generalizations of the two-dimensional smectic theory to higher dimensions and to crystals.

Keywords

Cite

@article{arxiv.0905.3535,
  title  = {Smectics: Symmetry Breaking, Singularities, and Surfaces},
  author = {Bryan Gin-ge Chen and Gareth P. Alexander and Randall D. Kamien},
  journal= {arXiv preprint arXiv:0905.3535},
  year   = {2009}
}

Comments

9 pages, 3 included figures

R2 v1 2026-06-21T13:04:44.450Z