Geometric aspects of the ODE/IM correspondence
From MaRDI portal
Publication:5059669
DOI10.1088/1751-8121/ab83c9OpenAlexW2990042892MaRDI QIDQ5059669
Roberto Tateo, Clare Dunning, Stefano Negro, Patrick E. Dorey
Publication date: 16 January 2023
Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1911.13290
Related Items (9)
WKB periods for higher order ODE and TBA equations ⋮ Form factors and correlation functions of \(\mathrm{T}\overline{\mathrm{T}}\)-deformed integrable quantum field theories ⋮ Spectrum of quantum KdV hierarchy in the semiclassical limit ⋮ On solutions of the Bethe Ansatz for the Quantum KdV model ⋮ On the origin of the correspondence between classical and quantum integrable theories ⋮ Deforming the ODE/IM correspondence with \(\mathrm{T}\overline{\mathrm{T}}\) ⋮ Entanglement entropy from form factors in \(\mathrm{T\overline{T}}\)-deformed integrable quantum field theories ⋮ Integrable sigma models at RG fixed points: quantisation as affine Gaudin models ⋮ ODE/IM correspondence for affine Lie algebras: a numerical approach
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Integrable structure of quantum field theory: classical flat connections versus quantum stationary states
- Quantisation of the effective string with TBA
- Some comments on spacelike minimal surfaces with null polygonal boundaries in \(AdS_m\)
- Thermodynamic Bethe ansatz equations for minimal surfaces in \(AdS_3\)
- Pohlmeyer reduction revisited
- Geometrical loci and cfts via the Virasoro symmetry of the mKdV-SG hierarchy: an excursus
- Thermodynamic bubble ansatz
- On space of integrable quantum field theories
- Bethe ansatz and the spectral theory of affine Lie algebra-valued connections. II: The non simply-laced case
- ODE/IM correspondence for modified \(B_2^{(1)}\) affine Toda field equation
- TBA equations and resurgent quantum mechanics
- ODE/IM correspondence and modified affine Toda field equations
- Mass scales and crossover phenomena in the homogeneous sine-gordon models
- Winding vacuum energies in a deformed \(\operatorname{O}(4)\) sigma model
- Integrable structure of conformal field theory. II: \(Q\)-operator and DDV equation
- Solitonic integrable perturbations of parafermionic theories
- Quantum integrable models and discrete classical Hirota equations
- Semi-classical spectrum of the homogeneous sine-Gordon theories
- On the relation between Stokes multipliers and the \(T\)-\(Q\) systems of conformal field theory
- Differential equations and integrable models: the \(\text{SU}(3)\) case
- A semi-classical limit of the gauge/string correspondence
- \( J\overline{T} \) deformed \(\mathrm{CFT}_{2}\) and string theory
- \( \mathrm{T}\overline{\mathrm{T}} \)-deformed 2D quantum field theories
- T-system on T-hook: Grassmannian solution and twisted quantum spectral curve
- \( T\overline{T} \)-deformations in closed form
- ODE/IM correspondence and the Argyres-Douglas theory
- The \(T\overline{T}\) perturbation and its geometric interpretation
- Solving the simplest theory of quantum gravity
- Integrable Hamiltonian systems and interactions through quadratic constraints
- Higher-level eigenvalues of \(Q\)-operators and Schrödinger equation
- Integrable structure of conformal field theory, quantum KdV theory and thermodynamic Bethe ansatz
- Wall-crossing, Hitchin systems, and the WKB approximation
- Quantum sine(h)-Gordon model and classical integrable equations
- On the scaling behaviour of the alternating spin chain
- \(T\overline{T}\)-deformed actions and (1,1) supersymmetry
- Pseudo-differential equations, and the Bethe ansatz for the classical Lie algebras
- Affine Gaudin models and hypergeometric functions on affine opers
- Partition function of the eight-vertex lattice model
- The symmetric space and homogeneous sine-Gordon theories
- Bethe ansatz and the spectral theory of affine Lie algebra-valued connections. I: The simply-laced case
- FUNCTIONAL RELATIONS IN SOLVABLE LATTICE MODELS I: FUNCTIONAL RELATIONS AND REPRESENTATION THEORY
- The Bethe Ansatz and the Tzitz\'eica-Bullough-Dodd equation
- From Fuchsian differential equations to integrable QFT
- Y-system for scattering amplitudes
- T-systems andY-systems in integrable systems
- Massive ODE/IM correspondence and nonlinear integral equations for ${A_r^{(1)}}$ -type modified affine Toda field equations
- An Elementary Proof of the Existence of Isothermal Parameters on a Surface
- On the ODE/IM correspondence for minimal models
- The Wentzel-Brillouin-Kramers Method of Solving the Wave Equation
- Introduction to Classical Integrable Systems
- Finite lattice Bethe ansatz systems and the Heun equation
- Wilson Loops in Large<mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" display="inline"><mml:mi mathvariant="italic">N</mml:mi></mml:math>Field Theories
- Functional relations in Stokes multipliers and solvable models related toUq(A(1)n)
- Unified approach to strings and vortices with soliton solutions
- Beyond the WKB approximation in -symmetric quantum mechanics
- Uniform asymptotic smoothing of Stokes’s discontinuities
- Anharmonic oscillators, the thermodynamic Bethe ansatz and nonlinear integral equations
- Bethe ansatz equations for the classical $A^{(1)}_{n}$ affine Toda field theories
- On Integrable Field Theories as Dihedral Affine Gaudin Models
- Integrals of nonlinear equations of evolution and solitary waves
- The ODE/IM correspondence
- Integrable quantum field theories with unstable particles
- Thermodynamic Bethe ansatz of the homogeneous sine-Gordon models
- Identifying the operator content, the homogeneous sine-Gordon models
- Spectral determinants for Schrödinger equation and \({\mathbb{Q}}\)-operators of conformal field theory
- Functional relations in Stokes multipliers -- fun with \(x^6+\alpha x^2\) potential
- Macroscopic strings as heavy quarks: large-\(N\) gauge theory and anti-de Sitter supergravity
- Integrable structure of \(W_3\) conformal field theory, quantum Boussinesq theory and boundary affine Toda theory
- Four-dimensional wall-crossing via three-dimensional field theory
This page was built for publication: Geometric aspects of the ODE/IM correspondence
