Permutation Symmetric Critical Phases in Disordered Non-Abelian Anyonic Chains

Abstract

Topological phases supporting non-abelian anyonic excitations have been proposed as candidates for topological quantum computation. In this paper, we study disordered non-abelian anyonic chains based on the quantum groups SU(2)k, a hierarchy that includes the =5/2 FQH state and the proposed =12/5 Fibonacci state, among others. We find that for odd k these anyonic chains realize infinite randomness critical phases in the same universality class as the Sk permutation symmetric multi-critical points of Damle and Huse (Phys. Rev. Lett. 89, 277203 (2002)). Indeed, we show that the pertinent subspace of these anyonic chains actually sits inside the Zk ⊂ Sk symmetric sector of the Damle-Huse model, and this Zk symmetry stabilizes the phase.