Abstract: |
Starting from the fusion rules for the algebra SO(5)2we construct one-dimensional lattice models of interacting anyons with commuting transfer matrices of ‘interactions round the face’ (IRF) type. The con-served topological charges of the anyon chain are recovered from the transfer matrices in the limit of large spectral parameter. The properties of the models in the thermodynamic limit and the low energy excitations are studied using Bethe ansatz methods. Two of the anyon models are critical at zero temperature. From the analysis of the finite size spectrum we find that they are effectively described by rational conformal field theories invariant under extensions of the Virasoro algebra, namely WB2and WD5, respectively. The latter contains primaries with half and quarter spin. The modular partition function and fusion rules are derived and found to be consistent with the results for the lattice model.
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License of this version: |
CC BY 3.0 Unported - http://creativecommons.org/licenses/by/3.0/
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Publication type: |
Article |
Publishing status: |
publishedVersion |
Publication date: |
2014 |
Keywords english: |
condensed matter, strongly correlated electrons, high energy physics, theory, mathematical physics, conformal invariance, dynkin diagrams, lattice models, spin chain, w-algebras, q-operator, sos model, thermodynamics, construction, excitations
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DDC: |
530 | Physik
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Related publications: |
http://arxiv.org/abs/1408.1282
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