Non-Abelian Fermionization and Fractional Quantum Hall Transitions

Abstract

There has been a recent surge of interest in dualities relating theories of Chern-Simons gauge fields coupled to either bosons or fermions within the condensed matter community, particularly in the context of topological insulators and the half-filled Landau level. Here, we study the application of one such duality to the long-standing problem of quantum Hall inter-plateaux transitions. The key motivating experimental observations are the anomalously large value of the correlation length exponent ≈ 2.3 and that is observed to be super-universal, i.e., the same in the vicinity of distinct critical points. Duality motivates effective descriptions for a fractional quantum Hall plateau transition involving a Chern-Simons field with U(Nc) gauge group coupled to Nf = 1 fermion. We study one class of theories in a controlled limit where Nf Nc and calculate to leading non-trivial order in the absence of disorder. Although these theories do not yield an anomalously large exponent within the large Nf Nc expansion, they do offer a new parameter space of theories that is apparently different from prior works involving abelian Chern-Simons gauge fields.