$Effective field theory and projective construction for Z[subscript k] parafermion fractional quantum Hall states$

Effective field theory and projective construction for Z[subscript k] parafermion fractional quantum Hall states

The projective construction is a powerful approach to deriving the bulk and edge field theories of non-Abelian fractional quantum Hall (FQH) states and yields an understanding of non-Abelian FQH states in terms of the simpler integer quantum Hall states. Here we show how to apply the projective cons...

Full description

Bibliographic Details
Main Authors:	Barkeshli, Maissam, Wen, Xiao-Gang
Other Authors:	Massachusetts Institute of Technology. Department of Physics
Format:	Article
Language:	en_US
Published:	American Physical Society 2010
Online Access:	http://hdl.handle.net/1721.1/58690 https://orcid.org/0000-0002-5874-581X

Similar Items

U(1) X U(1) XI Z(2) Chern-Simons theory and Z(4) parafermion fractional quantum Hall states
by: Barkeshli, Maissam, et al.
Published: (2010)

Bilayer quantum Hall phase transitions and the orbifold non-Abelian fractional quantum Hall states
by: Barkeshli, Maissam, et al.
Published: (2012)

Non-Abelian two-component fractional quantum Hall states
by: Barkeshli, Maissam, et al.
Published: (2011)

Structure of quasiparticles and their fusion algebra in fractional quantum Hall states
by: Barkeshli, Maissam, et al.
Published: (2010)

Anyon Condensation and Continuous Topological Phase Transitions in Non-Abelian Fractional Quantum Hall States
by: Barkeshli, Maissam, et al.
Published: (2011)

Anyon Condensation and Continuous Topological Phase Transitions in Non-Abelian Fractional Quantum Hall States
by: Barkeshli, Maissam, et al.
Published: (2011)

Classification of Abelian and non-Abelian multilayer fractional quantum Hall states through the pattern of zeros
by: Barkeshli, Maissam, et al.
Published: (2011)

Topological order in the fractional quantum Hall states
by: Barkeshli, Maissam
Published: (2012)

High-Temperature Fractional Quantum Hall States
by: Tang, Evelyn May Yin, et al.
Published: (2011)

Discretely holomorphic parafermions in lattice Z(N) models
by: Rajabpour, M, et al.
Published: (2007)

Phase transitions in ZN gauge theory and twisted ZN topological phases
by: Barkeshli, Maissam, et al.
Published: (2012)

How SU(2)4 Anyons are Z3 Parafermions
by: Fern, R, et al.
Published: (2017)

Pattern-of-Zeros Approach to Fractional Quantum Hall States and a Classification of Symmetric Polynomial of Infinite Variables
by: Wen, Xiao-Gang, et al.
Published: (2021)

Projective non-Abelian statistics of dislocation defects in a Z[subscript N] rotor model
by: You, Yi-Zhuang, et al.
Published: (2013)

High-field fractional quantum Hall effect in optical lattices
by: Palmer, R, et al.
Published: (2006)

High-Field Fractional Quantum Hall Effect in Optical Lattices
by: Palmer, R, et al.
Published: (2006)

High-field fractional quantum Hall effect in optical lattices.
by: Palmer, R, et al.
Published: (2006)

Continuous transitions between composite Fermi liquid and Landau Fermi liquid: A route to fractionalized Mott insulators
by: Barkeshli, Maissam, et al.
Published: (2012)

Topological phases with parafermions: theory and blueprints
by: Alicea, J, et al.
Published: (2016)

Conformal field theory and numerical techniques in the fractional quantum hall effect
by: Henderson, GJ
Published: (2023)

Multicomponent fractional quantum Hall effects
by: Davenport, S
Published: (2013)

Symmetry-Protected Quantum Spin Hall Phases in Two Dimensions
by: Liu, Zheng-Xin, et al.
Published: (2013)

Discretely holomorphic parafermions and integrable loop models
by: Ikhlef, Y, et al.
Published: (2009)

Trace functions of the parafermion vertex operator algebras
by: Dong, Chongying, et al.
Published: (2021)

Discretely holomorphic parafermions and integrable loop models
by: Ikhlef, Y, et al.
Published: (2009)

Exotic phases of interacting Majorana fermions and parafermions
by: O'Brien, E
Published: (2020)

Interaction of composite fermions with a gauge field in the fractional quantum Hall regime
by: Kim, YÅ ng-baek
Published: (2006)

Correlated topological insulators and the fractional magnetoelectric effect
by: Swingle, Brian Gordon, et al.
Published: (2011)

Graviton modes in fractional quantum hall liquids
by: Wang, Yuzhu
Published: (2023)

Algebraic approach to fractional quantum Hall effect
by: Nguyen, D, et al.
Published: (2018)

SYSTEMATIC STUDIES OF THE FRACTIONAL QUANTUM HALL-EFFECT
by: Nicholas, R, et al.
Published: (1987)

Floquet mechanism for non-Abelian fractional quantum hall states
by: Lee, Ching Hua, et al.
Published: (2019)

The unifying role of effective field in the composite fermion model of the fractional quantum Hall effect
by: Leadley, DR, et al.
Published: (1996)

Holomorphic parafermions in the Potts model and stochastic Loewner evolution
by: Riva, V, et al.
Published: (2006)

Adiabatic continuation of fractional Chern insulators to fractional quantum Hall States.
by: Scaffidi, T, et al.
Published: (2012)

Generalized quantum Hall projection Hamiltonians
by: Simon, S, et al.
Published: (2007)

EXPERIMENTAL TESTS OF FRACTIONAL QUANTUM HALL-EFFECT THEORY
by: Clark, R, et al.
Published: (1988)

Thermoelectric response and entropy of fractional quantum Hall systems
by: Sheng, D. N., et al.
Published: (2021)

Thermoelectric response and entropy of fractional quantum Hall systems
by: Sheng, DN, et al.
Published: (2021)

Microscopic theory for nematic fractional quantum Hall effect
by: Yang, Bo
Published: (2021)