Irreducible representations of the osp(2,1) and spl(2,1) graded Lie algebras

The exact \(S\)-matrix for an \(\text{osp}(2| 2)\) disordered system., Heisenberg spin chains based on \(\text{sl}(2|1)\) symmetry, Legendre's relation and the quantum equivalence osp\((4|4)_1 = \text{osp}(2|2)_{-2} \oplus su(2)_0\), Disordered Dirac fermions: the marriage of three different approaches, Universal \(R\)-matrix as integral operator, Algebraic Bethe ansatz for the gl\((1|2)\) generalized model and Lieb-Wu equations, N = 2 SUPERCONFORMAL FIELD THEORY ON THE BASIS OF osp(2|2), Relations between the Casimir operators of sl(1|2) and osp(2|2) superalgebras, Deriving the standard model from the simplest two-point K cycle, Integrable graded magnets, Generalised harmonic oscillator systems and their Fock space description, Representation theory of \(\mathfrak{sl}(2|1)\), Explicit reduction of spl(1,2) to osp(1,2) as a simplified model for applications of supersymmetry to nuclear physics, Lie structures in parasupersymmetric quantum mechanics: I. The standard supersymmetrization procedure, Lie structures in parasupersymmetric quantum mechanics: II. The spin-orbit coupling supersymmetrization procedure, A new invariant of superconformal OSp(n‖1), The exact solution and the finite-size behaviour of the Osp\((1| 2)\)-invariant spin chain, A Complete classification of indecomposable harish-chandra modules of the lie superalgebra B(0,1), On the composition factors of Kac modules for the Lie superalgebras sl(m/n), Integrable Anderson-type impurity in the supersymmetric \(t\)-\(J\) model, Supercoherent states, super-Kähler geometry and geometric quantization, Fusion rules and singular vectors of the \(\text{osp}(1|2)\) current algebra, Super Poisson-Lie structure on \(\text{SU}(mn)\) via \(\text{SL}(m|n, \mathbb C)^{\mathbb R}\), Application of generating function techniques to Lie superalgebras, Topological many-body states in quantum antiferromagnets via fuzzy supergeometry, A geometrical approach to super \(W\)-induced gravities in two dimensions, Wigner quantum systems. Two particles interacting via a harmonic potential. I. Two-dimensional space, Superfield and matrix realizations of highest weight representations for osp(m/2n), Classification of star and grade-star representations of C(n+1), Classification of all star and grade star irreps of gl(n‖1), \(R\)-matrices and spectrum of vertex models based on superalgebras, Fuzzy supersphere and supermonopole, Positive discrete series representations of the noncompact superalgebra Osp(4/2,R), A remark on the Casimir elements of Lie superalgebras and quantized Lie superalgebras, Racah coefficients and 6−j symbols for the quantum superalgebra Uq (osp(1‖2)), One-parameter family of an integrable \(\text{spl}(2| 1)\) vertex model: Algebraic Bethe ansatz and ground state structure, Strings from \(N=2\) gauged Wess-Zumino-Witten models, Racah–Wigner calculus for the super-rotation algebra. I, Transformations of some induced osp(3/2) modules in an so(3)⊕sp(2) basis, Clebsch–Gordan coefficients for the quantum superalgebra Uq (osp(1‖2)), Superconformal blocks: general theory, Finite-dimensional representations of the Lie superalgebra gl(2/2) in a gl(2)⊕gl(2) basis. II. Nontypical representations, The superalgebra embedding of OSP(1‖2) in SL(1‖2) and the grade star representations of SL(1‖2), ISOSPIN PARTICLE ON S² WITH ARBITRARY NUMBER OF SUPERSYMMETRIES, Boson–fermion representations of Lie superalgebras: The example of osp(1,2), The group with Grassmann structure UOSP(1.2), Ghost center and representations of the diagonal reduction algebra of \(\mathfrak{osp}(1 | 2)\), Linear operators with invariant polynomial space and graded algebra, Polynomial deformations of osp(1/2) and generalized parabosons, Integrable structure of superconformal field theory and quantum super-KdV theory, A remarkable connection between the representations of the Lie superalgebras osp(1,2n) and the Lie algebras o(2n+1), Phase diagram of an integrable alternating \(U_q[sl(2|1)\) superspin chain], Analytical formulas for Racah coefficients and 6-j symbols of the quantum superalgebra Uq(osp(1|2)), Super-Calogero model with OSp(\(2| 2\)) supersymmetry: is the construction unique?, Path-integral formalism for the supercoherent states, Effective action for strongly correlated electron systems, Graded Hopf maps and fuzzy superspheres, Supermultiplet of particles in a Coulomb potential: States and wave functions from the representation theory of OSp(2,1), Unimodal polynomials associated with Lie algebras and superalgebras, Supersymmetry and supercoherent states of a nonrelativistic free particle, Coherent states for the noncompact supergroups Osp(2/2N,R), Superspace formulation of general massive gauge theories and geometric interpretation of mass-dependent Becchi–Rouet–Stora–Tyutin symmetries, Non-unitary conformal field theory and logarithmic operators for disordered systems, Deformed supersymmetric quantum mechanics with spin variables, Structure constants for the \(\text{osp}(1|2)\) current algebra, Super-Toda theories and W-algebras from superspace Wess-Zumino-Witten models, Finite-dimensional irreducible representations of the SU(3/1) superalgebra, Massive CP\(^1\) theory from a microscopic model for doped antiferromagnets, On a possible algebra morphism of \(U_ q[osp(1/2n)\) onto the deformed oscillator algebra \(W_ q(n)\)], \(CP^{1|1}\) nonlinear sigma model vs strong electron correlations, GENERALIZED GAUGE THEORIES AND THE WEINBERG–SALAM MODEL WITH DIRAC–KÄHLER FERMIONS, Graded Lie algebras: Generalization of Hermitian representations, Graded tensor calculus, Kac–Dynkin diagrams and supertableaux, Creation operators and Bethe vectors of the osp(1|2) Gaudin model, A classification of four-dimensional Lie superalgebras, Projective representations of SU(2)ΛR4, Solutions to the Yang-Baxter equations with \(osp_q(1|2)\) symmetry: Lax operators, Harmonic analysis in \(d\)-dimensional superconformal field theory, Quantum \( \mathrm{SU} (2|1)\) supersymmetric \(\mathbb{C}^N\) Smorodinsky-Winternitz system, Character formulas for irreducible modules of the Lie superalgebras sl(m/n), Cohomology of Lie superalgebras and their generalizations, The osp(1,2)-covariant Lagrangian quantization of irreducible massive gauge theories, Classification of infinite dimensional irreducible modules for type I Lie superalgebras, The tensor product of two irreducible representations of the spl(2,1) superalgebra, The representations of spl(2,1)—an example of representations of basic superalgebras, Algebraic Bethe ansatz for \(gl(2,1)\) invariant 36-vertex models, On a certain construction of graded Lie algebras with derivation, Representations of Osp(2, 1) and the metaplectic representation, Principal five-dimensional subalgebras of Lie superalgebras, A simple differential operator realization of the super-rotation algebra, The super-rotation Racah–Wigner calculus revisited, Super angular momentum and super spherical harmonics, Graded parafermions, Highest weight representations for gl(m/n) and gl(m+n), Doped Heisenberg chains: spin-\(S\) generalizations of the supersymmetric \(t\)-\(J\) model, The BaxterQ-operator for the gradedSL(2|1) spin chain, Realization of spacetime conformal symmetry in \(D=10\), \(N=1\) superspace., The fuzzy supersphere, Canonical and differential realizations of OSP(3‖2) superalgebra, Wilson lines construction of \(\mathfrak{osp}(1|2)\) conformal blocks, ODE/IM correspondence and supersymmetric affine Toda field equations, Centralizers of the superalgebra $\mathfrak{osp}(1|2)$ : the Brauer algebra as a quotient of the Bannai–Ito algebra, Mixed supertableaux of the superunitary groups. I. SU(n‖1), Quantum OSP-invariant nonlinear Schrödinger equation, Indecomposable doubling for representations of the type I Lie superalgebras sl(m/n) and osp(2/2n)

• Classification of some 2-graded Lie algebras
• Semisimple graded Lie algebras
• On the structure of simple pseudo Lie algebras and their invariant bilinear forms
• Graded Lie algebras: Generalization of Hermitian representations
• The Killing form for graded Lie algebras
• Simple supersymmetries