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arxiv: 1901.08238 · v2 · pith:PNGNBSSWnew · submitted 2019-01-24 · ✦ hep-th · cond-mat.other· quant-ph

Ishibashi States, Topological Orders with Boundaries and Topological Entanglement Entropy

classification ✦ hep-th cond-mat.otherquant-ph
keywords entanglementtopologicalentropycasesinterfaceanyonboundariesboundary
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In this paper, we study gapped edges/interfaces in a 2+1 dimensional bosonic topological order and investigate how the topological entanglement entropy is sensitive to them. We present a detailed analysis of the Ishibashi states describing these edges/interfaces making use of the physics of anyon condensation in the context of Abelian Chern-Simons theory, which is then generalized to more non-Abelian theories whose edge RCFTs are known. Then we apply these results to computing the entanglement entropy of different topological orders. We consider cases where the system resides on a cylinder with gapped boundaries and that the entanglement cut is parallel to the boundary. We also consider cases where the entanglement cut coincides with the interface on a cylinder. In either cases, we find that the topological entanglement entropy is determined by the anyon condensation pattern that characterizes the interface/boundary. We note that conditions are imposed on some non-universal parameters in the edge theory to ensure existence of the conformal interface, analogous to requiring rational ratios of radii of compact bosons.

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