An integrability illusion: vanishing transfer matrices associated with generalised Gaudin superalgebras
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Publication:6637254
DOI10.1016/j.nuclphysb.2024.116706MaRDI QIDQ6637254
Mitchell Jones, Phillip S. Isaac, J. R. Links
Publication date: 13 November 2024
Published in: Unnamed Author (Search for Journal in Brave)
Cites Work
- Unnamed Item
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- Separation of variables in the Gaudin model
- What is a classical r-matrix?
- Solutions of the classical Yang-Baxter equation for simple superalgebras
- Solutions of the Yang-Baxter equation
- Exactly-solvable models derived from a generalized Gaudin algebra
- An invariant supertrace for the category of representations of Lie superalgebras of type I
- A sketch of Lie superalgebra theory
- Algebraic Bethe ansatz for \(gl(2,1)\) invariant 36-vertex models
- One-parameter family of an integrable \(\text{spl}(2| 1)\) vertex model: Algebraic Bethe ansatz and ground state structure
- On the exact solution of models based on non-standard representations
- Completeness of Bethe ansatz for Gaudin models associated with \(\mathfrak{gl}(1|1)\)
- Representation theory of \(\mathfrak{sl}(2|1)\)
- Generalized shift elements and classical \(r\)-matrices: construction and applications
- The quantum Gaudin system
- THE MODIFIED CLASSICAL YANG-BAXTER EQUATION AND SUPERSYMMETRIC GEL’FAND-DIKII BRACKETS
- Multi-parametric R-matrix for the $\mathfrak {sl}(2|1)$sl(2|1) Yangian
- Representations of centrally extended Lie superalgebra $\mathfrak {psl}(2|2)$psl(2|2)
- Indices of representations of simple superalgebras
- Classical Yang–Baxter equations and quantum integrable systems
- Solutions of the graded classical Yang-Baxter equation and integrable models
- Generalized quantum Gaudin spin chains, involutive automorphisms and “twisted” classical r-matrices
- OPERATOR FORMS OF THE CLASSICAL YANG–BAXTER EQUATION IN LIE SUPERALGEBRAS
- The representations of spl(2,1)—an example of representations of basic superalgebras
- LIE BI-SUPERALGEBRAS AND THE GRADED CLASSICAL YANG-BAXTER EQUATION
- Semisimple graded Lie algebras
- On the structure of simple pseudo Lie algebras and their invariant bilinear forms
- Solutions of the Yang-Baxter equation with extra nonadditive parameters. II. Uq(gl(m/n))
- What a Classical r-Matrix Really Is
- A central extension of Uq sl(2|2)(1) and R-matrices with a new parameter
- Uqosp(2,2) lattice models
- Extended integrability regime for the supersymmetricUmodel
- Introduction to classical and quantum integrability
- Integrable spin-${\frac{1}{2}}$ Richardson–Gaudin XYZ models in an arbitrary magnetic field
- Gaudin models for 𝔤𝔩(m|n)
- Index of representation of a simple lie algebra
- LIE GROUPS WITH COMMUTING AND ANTICOMMUTING PARAMETERS
- Solutions of the Gaudin equation and Gaudin algebras
- Solutions of the classical Yang-Baxter equation for simple Lie algebras
- Gaudin Hamiltonians on unitarizable modules over classical Lie (super)algebras
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