A non-Abelian twist to integer quantum Hall states

Abstract

Through a theoretical coupled wire model, we construct strongly correlated electronic integer quantum Hall states. As a distinguishing feature, these states support electric and thermal Hall transport violating the Wiedemann-Franz law as (xy/σxy)/[(π2kB2T)/3e2]<1.We propose a new Abelian incompressible fluid at filling =16 that supports a bosonic chiral (E8)1 conformal field theory at the edge and is intimately related to topological paramagnets in (3+1)D. We further show that this topological phase can be partitioned into two non-Abelian quantum Hall states at filling =8, each carrying bosonic chiral (G2)1 or (F4)1 edge theories, and hosting Fibonacci anyonic excitations in the bulk. Finally, we discover a new notion of particle-hole conjugation based on the E8 state that relates the G2 and F4 Fibonacci states.