# Pairing in Luttinger Liquids and Quantum Hall States

**Authors:** Charles L. Kane, Ady Stern, Bertrand I. Halperin

arXiv: 1701.06200 · 2017-07-26

## TL;DR

This paper explores the phases of spinless electrons in quantum wires and their array-based quantum Hall states, revealing new topological and fractional quantum Hall phases, including non-Abelian states like Moore-Read.

## Contribution

It introduces a detailed analysis of phases in single-channel wires, connecting them to quantum Hall states and identifying novel non-Abelian phases and their phase transitions.

## Key findings

- Identification of Luttinger and strongly paired phases in wires
- Construction of Laughlin and fractional quantum Hall states from wire arrays
- Discovery of non-Abelian quantum Hall states, including Moore-Read

## Abstract

We study spinless electrons in a single channel quantum wire interacting through attractive interaction, and the quantum Hall states that may be constructed by an array of such wires. For a single wire the electrons may form two phases, the Luttinger liquid and the strongly paired phase. The Luttinger liquid is gapless to one- and two-electron excitations, while the strongly paired state is gapped to the former and gapless to the latter. In contrast to the case in which the wire is proximity-coupled to an external superconductor, for an isolated wire there is no separate phase of a topological, weakly paired, superconductor. Rather, this phase is adiabatically connected to the Luttinger liquid phase. The properties of the one dimensional topological superconductor emerge when the number of channels in the wire becomes large. The quantum Hall states that may be formed by an array of single-channel wires depend on the Landau level filling factors. For odd-denominator fillings $\nu=1/(2n+1)$, wires at the Luttinger phase form Laughlin states while wires in the strongly paired phase form bosonic fractional quantum Hall state of strongly-bound pairs at a filling of $1/(8n+4)$. The transition between the two is of the universality class of Ising transitions in three dimensions. For even-denominator fractions $\nu=1/2n$ the two single-wire phases translate into four quantum Hall states. Two of those states are bosonic fractional quantum Hall states of weakly- and strongly- bound pairs of electrons. The other two are non-Abelian quantum Hall states, which originate from coupling wires close to their critical point. One of these non-Abelian states is the Moore-Read state. The transition between all these states are of the universality class of Majorana transitions. We point out some of the properties that characterize the different phases and the phase transitions.

## Full text

_Full body text omitted from this summary view._ Fetch the complete paper as Markdown: https://tomesphere.com/paper/1701.06200/full.md

## Figures

3 figures with captions in the complete paper: https://tomesphere.com/paper/1701.06200/full.md

## References

29 references — full list in the complete paper: https://tomesphere.com/paper/1701.06200/full.md

---
Source: https://tomesphere.com/paper/1701.06200