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Paper detail

Breakdown of a perturbed Z_N topological phase

We study the robustness of a generalized Kitaev's toric code with Z_N degrees of freedom in the presence of local perturbations. For N=2, this model reduces to the conventional toric code in a uniform magnetic field. A quantitative analysis is performed for the perturbed Z_3 toric code by applying a combination of high-order series expansions and variational techniques. We provide strong evidences for first- and second-order phase transitions between topologically-ordered and polarized phases. Most interestingly, our results also indicate the existence of topological multi-critical points in the phase diagram.

preprint2012arXivOpen access
M. D. SchulzS. DusuelR. OrusJ. VidalK. P. Schmidt
cond-mat.stat-mechhep-lathep-thquant-ph
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M. D. SchulzS. DusuelR. OrusJ. VidalK. P. Schmidt

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