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Index theorem, spin Chern Simons theory and fractional magnetoelectric effect in strongly correlated topological insulators

arXiv:1105.6316

Abstract

Making use of index theorem and spin Chern Simons theory, we construct an effective topological field theory of strongly correlated topological insulators coupling to a nonabelian gauge field $ SU(N) $ with an interaction constant $ g $ in the absence of the time-reversal symmetry breaking. If $ N $ and $ g $ allow us to define a t'Hooft parameter $ λ$ of effective coupling as $ λ= N g^{2} $, then our construction leads to the fractional quantum Hall effect on the surface with Hall conductance $ σ_{H}^{s} = \frac{1}{4λ} \frac{e^{2}}{h} $. For the magnetoelectric response described by a bulk axion angle $ θ$, we propose that the fractional magnetoelectric effect can be realized in gapped time reversal invariant topological insulators of strongly correlated bosons or fermions with an effective axion angle $ θ_{eff} = \fracπ{2 λ} $ if they can have fractional excitations and degenerate ground states on topologically nontrivial and oriented spaces. Provided that an effective charge is given by $ e_{eff} = \frac{e}{\sqrt{2 λ}} $, it is shown that $ σ_{H}^{s} = \frac{e_{eff}^{2}}{2h} $, resulting in a surface Hall conductance of gapless fermions with $ e_{eff} $ and a pure axion angle $ θ= π$.

Submitted to PR B