On $A_{n-1}^{(1)},B_{n}^{(1)}, C_{n}^{(1)}, D_{n}^{(1)},A_{2n}^{(2)}, A_{2n-1}^{(2)}$ and $D_{n+1}^{(2)}$ Reflection $K$-Matrices

A. Lima-Santos; R. Malara

arxiv: nlin/0412058 · v5 · pith:LLLMOQVPnew · submitted 2004-12-21 · 🌊 nlin.SI · hep-th

On A_(n-1)⁽¹⁾,B_(n)⁽¹⁾, C_(n)⁽¹⁾, D_(n)⁽¹⁾,A_(2n)⁽²⁾, A_(2n-1)⁽²⁾ and D_(n+1)⁽²⁾ Reflection K-Matrices

R. Malara , A. Lima-Santos This is my paper

classification 🌊 nlin.SI hep-th

keywords solutionsgeneralmatricesaffinealgebrasapplyingassociatedboundary

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We present the classification of the most general regular solutions to the boundary Yang-Baxter equations for vertex models associated with non-exceptional affine Lie algebras. Reduced solutions found by applying a limit procedure to the general solutions are discussed. We also present the list of diagonal $K$-matrices. Special cases are considered separately.

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Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

Exact strong zero modes are generic in integrable spin systems with large anisotropy
quant-ph 2026-05 unverdicted novelty 7.0

Exact strong zero modes arise generically in integrable spin systems with large anisotropy from quasi-periodicity of the R-matrix and tracelessness of the K-matrix.
Exact strong zero modes are generic in integrable spin systems with large anisotropy
quant-ph 2026-05 unverdicted novelty 7.0

Exact strong zero modes arise generically in integrable anisotropic spin models from quasi-periodicity of R-matrices and tracelessness of K-matrices, unifying known cases and predicting new ones.