Synthetic non-Abelian statistics by Abelian anyon condensation
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Topological degeneracy is the degeneracy of the ground states in a many-body system in the large-system-size limit. Topological degeneracy cannot be lifted by any local perturbation of the Hamiltonian. The topological degeneracies on closed manifolds have been used to discover/define topological order in many-body systems, which contain excitations with fractional statistics. In this paper, we study a new type of topological degeneracy induced by condensing anyons along a line in two-dimensional topological ordered states. Such topological degeneracy can be viewed as carried by each end of the line defect, which is a generalization of Majorana zero modes. The topological degeneracy can be used as a quantum memory. The ends of line defects carry projective non-Abelian statistics even though they are produced by the condensation of Abelian anyons, and braiding them allows us to perform fault tolerant quantum computations.
Date issued
2013-01Department
Massachusetts Institute of Technology. Department of PhysicsJournal
Physical Review B
Publisher
American Physical Society
Citation
You, Yi-Zhuang, Chao-Ming Jian, and Xiao-Gang Wen. “Synthetic Non-Abelian Statistics by Abelian Anyon Condensation.” Phys. Rev. B 87, no. 4 (January 2013). © 2013 American Physical Society
Version: Final published version
ISSN
1098-0121
1550-235X