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Topological insulators and topological non-linear sigma models

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arxiv 1003.2230 v3 pith:HANDI7HA submitted 2010-03-11 cond-mat.str-el

Topological insulators and topological non-linear sigma models

classification cond-mat.str-el
keywords topologicalsigmainsulatorsmodelsnonlinearchern-simonsdimensionalmodel
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In this paper we link the physics of topological nonlinear {\sigma} models with that of Chern-Simons insulators. We show that corresponding to every 2n-dimensional Chern-Simons insulator there is a (n-1)-dimensional topological nonlinear {\sigma} model with the Wess-Zumino-Witten term. Breaking internal symmetry in these nonlinear {\sigma} models leads to nonlinear {\sigma} models with the {\theta} term. [This is analogous to the dimension reduction leading from 2n-dimensional Chern-Simons insulators to (2n-1) and (2n-2)-dimensional topological insulators protected by discrete symmetries.] The correspondence described in this paper allows one to derive the topological term in a theory involving fermions and order parameters (we shall referred to them as "fermion-{\sigma} models") when the conventional gradient-expansion method fails. We also discuss the quantum number of solitons in topological nonlinear {\sigma} model and the electromagnetic action of the (2n-1)-dimensional topological insulators. Throughout the paper we use a simple model to illustrate how things work.

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