BOUNDARY ONE-POINT FUNCTIONS, SCATTERING, AND BACKGROUND VACUUM SOLUTIONS IN TODA THEORIES
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Publication:4803838
DOI10.1142/S0217751X03012436zbMath1078.81535arXivhep-th/0207152OpenAlexW3101380205MaRDI QIDQ4803838
Vladimir A. Fateev, Enrico Onofri
Publication date: 2003
Published in: International Journal of Modern Physics A (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/hep-th/0207152
Groups and algebras in quantum theory and relations with integrable systems (81R12) Dynamical systems in other branches of physics (quantum mechanics, general relativity, laser physics) (37N20) Lattice dynamics; integrable lattice equations (37K60)
Related Items (2)
Boundary one-point function, Casimir energy and boundary state formalism in \(D+1\) dimensional QFT ⋮ Universal boundary reflection amplitudes
Cites Work
- Exact \(S\)-matrices for non-simply-laced affine Toda theories
- TBA and TCSA with boundaries and excited states.
- Classically integrable boundary conditions for affine Toda field theories
- Boundary one-point functions, scattering theory and vacuum solutions in integrable systems
- Boundary energy and boundary states in integrable quantum field theories
- Factorized scattering in the presence of reflecting boundaries
- Reflection factors and a two-parameter family of boundary bound states in the sinh-Gordon model
- EXPECTATION VALUES OF BOUNDARY FIELDS IN INTEGRABLE BOUNDARY TODA THEORIES
- Reflection amplitudes in non-simply laced Toda theories and thermodynamic Bethe ansatz
- Finite size effects in boundary sine-Gordon theory
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