Integrable aspects of the scaling \(q\)-state Potts models. II: finite-size effects
From MaRDI portal
Publication:1566282
DOI10.1016/S0550-3213(03)00182-2zbMath1052.82010arXivhep-th/0208202MaRDI QIDQ1566282
Roberto Tateo, Andrew Pocklington, Patrick E. Dorey
Publication date: 1 June 2003
Published in: Nuclear Physics. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/0208202
Exactly solvable models; Bethe ansatz (82B23) Lattice systems (Ising, dimer, Potts, etc.) and systems on graphs arising in equilibrium statistical mechanics (82B20)
Related Items (6)
The diluteALmodels and the Φ1,2perturbation of unitary minimal CFTs ⋮ Scattering and duality in the 2 dimensional OSp\((2\mid 2)\) Gross Neveu and sigma models ⋮ From \(S\)-matrices to the thermodynamic Bethe ansatz ⋮ Fields, particles and universality in two dimensions ⋮ Integrable aspects of the scaling \(q\)-state Potts models. I: Bound states and bootstrap closure ⋮ Entanglement of the 3-state Potts model via form factor bootstrap: total and symmetry resolved entropies
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Operator content of two-dimensional conformally invariant theories
- Quantum field theories in finite volume: Excited state energies
- On the relation between \(\Phi_{(1,2)}\) and \(\Phi_{(1,5)}\) perturbed minimal models and unitarity
- RSOS revisited
- Critical behavior of two-dimensional spin models and charge asymmetry in the Coulomb gas
- The A-D-E classification of minimal and \(A_ 1^{(1)}\) conformal invariant theories
- Infinite conformal symmetry in two-dimensional quantum field theory
- Affine Toda field theory and exact \(S\)-matrices
- Excited states in some simple perturbed conformal field theories
- The perturbations \(\phi_{2,1}\) and \(\phi_{1,5}\) of the minimal models \(M(p,p^\prime\)) and the trinomial analogue of Bailey's lemma
- \(Y\)-systems and generalized associahedra
- Integrable aspects of the scaling \(q\)-state Potts models. I: Bound states and bootstrap closure
- From fusion hierarchy to excited state TBA
- Thermodynamic Bethe ansatz for the subleading magnetic perturbation of the tricritical Ising model
- Continued fraction TBA and functional relations in \(XXZ\) model at root of unity.
- Quantum Jacobi-Trudi formula and \(E_8\) structure in the Ising model in a field
- Exact \(S\)-matrices for bound states of \(a^{(1)}_ 2\) affine Toda solitons.
- Differential equations and integrable models: the \(\text{SU}(3)\) case
- Excited-state thermodynamics
- Root systems and purely elastic \(S\)-matrices. II
- Excited states by analytic continuation of TBA equations
- Excited state TBA for the \(\phi_{2,1}\) perturbed \(M_{3,5}\) model
- Order parameters of the dilute A models
- Generalized KdV and quantum inverse scattering description of conformal minimal models
- Relations between the Coulomb gas picture and conformal invariance of two-dimensional critical models
- Thermodynamic Bethe ansatz and dilogarithm identities. I.
- Massive and massless phases in self-dual \(\mathbb{Z}_N\) spin models: Some exact results from the thermodynamic Bethe ansatz
- Integrable structure of conformal field theory, quantum KdV theory and thermodynamic Bethe ansatz
- On a generalised bootstrap principle.
- SPECTRA IN CONFORMAL FIELD THEORIES FROM THE ROGERS DILOGARITHM
- INTEGRABLE PERTURBATIONS OF CFT WITH COMPLEX PARAMETER: THE M3/5 MODEL AND ITS GENERALIZATIONS
- MASSLESS FLOWS I: THE SINE-GORDON AND O(n) MODELS
- MASSLESS FLOWS II: THE EXACT S-MATRIX APPROACH
- S MATRICES OF ϕ1,2-PERTURBED MINIMAL MODELS: IRF FORMULATION AND BOOTSTRAP PROGRAM
- FUNCTIONAL RELATIONS IN SOLVABLE LATTICE MODELS I: FUNCTIONAL RELATIONS AND REPRESENTATION THEORY
- THE SINE-GORDON MODEL AS $\mathcal{SO}(2n)_{1} \times \mathcal{SO}(2n)_{1} \over \mathcal{SO}(2n)_{2}$-PERTURBED COSET THEORY AND GENERALIZATIONS
- THERMODYNAMIC BETHE ANSATZ AND THREE-FOLD TRIANGULATIONS
- A TOPOLOGICAL INVARIANT OF RG FLOWS IN 2D INTEGRABLE QUANTUM FIELD THEORIES
- Restricted solid-on-solid models connected with simply laced algebras and conformal field theory
- Central charges of the 6- and 19-vertex models with twisted boundary conditions
- QUANTIZING SL(N) SOLITONS AND THE HECKE ALGEBRA
- A braided Yang–Baxter algebra in a theory of two coupled lattice quantum KdV: algebraic properties and ABA representations
- Representations of the exceptional and other Lie algebras with integral eigenvalues of the Casimir operator
- ExactS-matrices for supersymmetric sigma models and the Potts model
- Complex excitations in the thermodynamic Bethe-anzatz approach
- New thermodynamic Bethe ansatz equations without strings
- New construction of solvable lattice models including an Ising model in a field
- Sigma Models as Perturbed Conformal Field Theories
- INTEGRABLE FIELD THEORY OF THE q-STATE POTTS MODEL WITH 0<q<4
- Thermodynamics of the complex su(3) Toda theory
- The perturbation \(\varphi_{2,1}\) of the \(M(p,p+1)\) models of conformal field theory and related polynomial-character identities
- New families of flows between two-dimensional conformal field theories
- Integrable structure of \(W_3\) conformal field theory, quantum Boussinesq theory and boundary affine Toda theory
This page was built for publication: Integrable aspects of the scaling \(q\)-state Potts models. II: finite-size effects
