Reflection matrices for theU_q[sl(m|n)⁽¹⁾] vertex model

Solving and classifying the solutions of the Yang-Baxter equation through a differential approach. Two-state systems, Reflection \(K\)-matrices for a nineteen vertex model with \(U_q [\operatorname{osp}(2 | 2)^{(2)}\) symmetry], Solutions to graded reflection equation of \(\mathrm{GL}\)-type, Reflection matrices withU_q[osp⁽²⁾(2|2m) symmetry], Fermionic reflection matrices, Boundary algebraic Bethe Ansatz for a nineteen vertex model withU_q  [osp(2|2)⁽²⁾ symmetry], On the \(\mathcal{{U}}_{q}[osp(1|2)\) Temperley-Lieb model], A boundary matrix for AdS/CFTSU(1|1) spin chain

• Central extensions of quantum current groups
• Factorizing particles on a half-line and root systems
• Structure of basic Lie superalgebras and of their affine extensions
• Quantum Lie superalgebras and q-oscillators
• \(A_{n-1}^{(1)}\) reflection \(K\)-matrices
• Reflection matrices for theU_q[spo(2n|2m) vertex model]
• The nested Bethe ansatz for ‘all’ open spin chains with diagonal boundary conditions
• Boundary conditions for integrable quantum systems
• Lie superalgebras
• Nested Bethe ansatz for Perk-Schultz model with open boundary conditions