Infinite-Randomness Fixed Points for Chains of Non-Abelian Quasiparticles
Abstract
One-dimensional chains of non-Abelian quasiparticles described by SU(2)k Chern-Simons-Witten theory can enter random singlet phases analogous to that of a random chain of ordinary spin-1/2 particles (corresponding to k ∞). For k=2 this phase provides a random singlet description of the infinite randomness fixed point of the critical transverse field Ising model. The entanglement entropy of a region of size L in these phases scales as SL d3 2 L for large L, where d is the quantum dimension of the particles.
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