Electronic structure of topological superconductors in the presence of a vortex lattice
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Certain types of topological superconductors and superfluids are known to host protected Majorana zero modes in cores of Abrikosov vortices. When such vortices are arranged in a dense periodic lattice one expects zero modes from neighboring vortices to hybridize and form dispersing bands. Understanding the structure of these bands is essential for the schemes that aim to employ the zero modes in quantum computation applications and in studies of their strongly interacting phases. We investigate here the band formation phenomenon in two concrete models, describing a two dimensional p + ip superconductor and a superconducting surface of a three-dimensional strong topological insulator (Fu-Kane model), using a combination of analytical and numerical techniques. We find that the physics of the Majorana bands is well described by tight binding models of Majorana fermions coupled to a static Z2 gauge field with a non-trivial gauge flux through each plaquette, in accord with expectations based on very general arguments. In the case of the Fu-Kane model we also find that, irrespective of the lattice geometry, the Majorana band becomes completely flat at the so called neutrality point (chemical potential coincident with the Dirac point) where the model exhibits an extra chiral symmetry. In this limit the low energy physics will be dominated by four-fermion interaction terms which are permitted by symmetries and may arise from the Coulomb interaction between the constituent electron degrees of freedom.
[1] Ericka Stricklin-Parker,et al. Ann , 2005 .
[2] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.
[3] G. Schmid. The Nature of Nanotechnology , 2010 .
[4] G. Volovik,et al. The Universe in a Helium Droplet , 2003 .