SU(N) Toric Code and Nonabelian Anyons
Abstract
We construct SU(N) toric code model describing the dynamics of SU(N) electric and magnetic fluxes on a two dimensional torus. We show that the model has N2 topologically distinct ground states |0( p, q) which are loop states characterized by ZN ZN centre charges ( p, q =0,1,2,·s, N-1). We explicitly construct them in terms of coherent superpositions of all possible spin network states on torus with Wigner coefficients as their amplitudes. All excited quasiparticle states with SU(N) electric charges and magnetic fluxes are constructed. We show that the braiding statistics of these SU(N) electric, magnetic quasiparticles or nonabelian anyons is encoded in the Wigner rotation matrices.
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