Bosonization at finite temperature and anyon condensation
From MaRDI portal
Publication:1572497
DOI10.1016/S0550-3213(99)00774-9zbMath0951.81098arXivhep-th/9906205MaRDI QIDQ1572497
Antonio Liguori, Mihail Mintchev, Luigi Pilo
Publication date: 12 July 2000
Published in: Nuclear Physics. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/9906205
Model quantum field theories (81T10) Many-body theory; quantum Hall effect (81V70) Quantum equilibrium statistical mechanics (general) (82B10)
Related Items
Anyon Quantum Transport and Noise Away from Equilibrium ⋮ Bose-Einstein condensation and condensation of \(q\)-particles in equilibrium and nonequilibrium thermodynamics ⋮ The massless thermal field and the thermal fermion bosonization in two dimensions ⋮ Properties of size-dependent models having quasiperiodic boundary conditions ⋮ TWO-DIMENSIONAL ANYONS AND THE TEMPERATURE DEPENDENCE OF COMMUTATOR ANOMALIES ⋮ Correlation functions and momentum distribution of one-dimensional hard-core anyons in optical lattices ⋮ One-body reduced density matrix of trapped impenetrable anyons in one dimension ⋮ Two-dimensional thermofield bosonization II: Massive fermions ⋮ Gauge-invariant quasi-free states on the algebra of the anyon commutation relations ⋮ One-particle density matrix of a trapped Lieb–Liniger anyonic gas ⋮ Determinant formula for the field form factor in the anyonic Lieb–Liniger model
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Algebraic fermion bosonization
- Generalized Thirring models
- Conformal field theory approach to gapless 1D fermion systems and application to the edge excitations of \(\nu= 1/(2p+1)\) quantum Hall sequences
- Quantum field theory, bosonization and duality on the half line.
- Theta vacua, charge confinement and charged sectors from nonregular representations of CCR algebras
- Fock representations of quantum fields with generalized statistics
- Quantisation in indefinite metric
- Anyons and the Bose-Fermi duality in the finite-temperature Thirring model
