Tridiagonal pairs of \(q\)-Racah type

Using Catalan words and a \(q\)-shuffle algebra to describe the Beck PBW basis for the positive part of \(U_q( \widehat{\mathfrak{sl}}_2)\), The Lusztig automorphism of the \(q\)-Onsager algebra, Bidiagonal triads and the tetrahedron algebra, Compatibility and companions for Leonard pairs, An infinite-dimensional \(\square_q\)-module obtained from the \(q\)-shuffle algebra for affine \(\mathfrak{sl}_2\), Circular bidiagonal pairs, The algebra \(U_q(\mathfrak{sl}_2)\) in disguise, The compact presentation for the alternating central extension of the \(q\)-Onsager algebra, A characterization of Leonard pairs using the parameters \(\{a_i\}^d_{i=0}\), Two commuting operators associated with a tridiagonal pair, Twisting finite-dimensional modules for the \(q\)-Onsager algebra \(\mathcal{O}_q\) via the Lusztig automorphism, Unnamed Item, Near-bipartite Leonard pairs, A characterization of Leonard pairs using the notion of a tail, Some q-Exponential Formulas Involving the Double Lowering Operator ψ for a Tridiagonal Pair (Research), Coideal algebras from twisted Manin triples, Tridiagonal pairs of \(q\)-Racah type, the double lowering operator \({\psi}\), and the quantum algebra \(U_q(\mathfrak{sl}_2)\), A conjecture concerning the \(q\)-Onsager algebra, The alternating central extension of the \(q\)-Onsager algebra, The \(q\)-Onsager algebra and the positive part of \(U_q(\hat{\mathfrak{sl}}_2)\), Bidiagonal triples, The \(q\)-Onsager algebra and the universal Askey-Wilson algebra, An action of the free product \(\mathbb{Z}_2 \star \mathbb{Z}_2 \star \mathbb{Z}_2\) on the \(q\)-Onsager algebra and its current algebra, BIDIAGONAL PAIRS, THE LIE ALGEBRA 𝔰𝔩₂, AND THE QUANTUM GROUP U_q(𝔰𝔩₂), Tridiagonal pairs of \(q\)-Racah type and the \(\mu \)-conjecture, Thin Hessenberg pairs, A classification of sharp tridiagonal pairs, Mock tridiagonal systems, Generalized \(q\)-Onsager algebras and boundary affine Toda field theories, HOW TO SHARPEN A TRIDIAGONAL PAIR, Double lowering operators on polynomials, Notes on the Leonard system classification, Commutative association schemes, On the shape of a tridiagonal pair, Circular Hessenberg pairs, A bispectral q-hypergeometric basis for a class of quantum integrable models

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• The subconstituent algebra of an association scheme. I
• The subconstituent algebra of an association scheme. III
• Some trace formulae involving the split sequences of a Leonard pair
• Matrix units associated with the split basis of a Leonard pair
• Balanced Leonard pairs
• Linear transformations that are tridiagonal with respect to both eigenbases of a Leonard pair
• The tetrahedron algebra and its finite-dimensional irreducible modules
• An integrable structure related with tridiagonal algebras
• Deformed Dolan-Grady relations in quantum integrable models
• A new (in)finite-dimensional algebra for quantum integrable models
• The \(q\)-deformed analogue of the Onsager algebra: beyond the Bethe ansatz approach
• The split decomposition of a tridiagonal pair
• Sharp tridiagonal pairs
• Tridiagonal pairs of shape \((1,2,1)\)
• Towards a classification of the tridiagonal pairs
• The structure of a tridiagonal pair
• Tridiagonal pairs and the \(\mu \)-conjecture
• Tridiagonal pairs and the \(q\)-tetrahedron algebra
• A q-difference analogue of \(U({\mathfrak g})\) and the Yang-Baxter equation
• Quantum affine algebras
• The shape of a tridiagonal pair.
• Leonard pairs and the \(q\)-Racah polynomials
• Two linear transformations each tridiagonal with respect to an eigenbasis of the other; comments on the parameter array
• Tridiagonal pairs and the Askey--Wilson relations
• Mutual integrability, quadratic algebras, and dynamical symmetry
• Introduction to Leonard pairs.
• The \(q\)-version of a theorem of Bochner
• Askey-Wilson polynomials and the quantum \(\text{SU} (2)\) group: Survey and applications
• Tridiagonal pairs and the quantum affine algebra \(U_q(\widehat{\text{sl}}_2)\).
• An elementary approach to \(6j\)-symbols (classical, quantum, rational, trigonometric, and elliptic)
• Tridiagonal pairs of Krawtchouk type
• The switching element for a Leonard pair
• The determinant of \(AA^{*} - A^{*}A\) for a Leonard pair \(A,A^{*}\)
• TWO RELATIONS THAT GENERALIZE THE Q-SERRE RELATIONS AND THE DOLAN-GRADY RELATIONS
• THE AUGMENTED TRIDIAGONAL ALGEBRA
• TWO NON-NILPOTENT LINEAR TRANSFORMATIONS THAT SATISFY THE CUBIC q-SERRE RELATIONS
• A Set of Orthogonal Polynomials That Generalize the Racah Coefficients or $6 - j$ Symbols
• Orthogonal Polynomials, Duality and Association Schemes
• Onsager’s algebra and the Dolan–Grady condition in the non-self-dual case
• Askey-wilson polynomials as spherical functions on SU q(2)
• Multivariable Orthogonal Polynomials and Coupling Coefficients for Discrete Series Representations
• $lquot$Leonard pairs$rquot$ in classical mechanics
• 𝑞-Krawtchouk polynomials as spherical functions on the Hecke algebra of type 𝐵
• The structure of quotients of the Onsager algebra by closed ideals *
• A family of tridiagonal pairs related to the quantum affine algebra U_q(sl_2)
• LEONARD PAIRS AND THE ASKEY–WILSON RELATIONS
• A deformed analogue of Onsager’s symmetry in the XXZ open spin chain
• Exact spectrum of the XXZ open spin chain from theq-Onsager algebra representation theory
• Askey–Wilson Polynomials as Zonal Spherical Functions on the ${\operatorname{SU}}(2)$ Quantum Group
• Finite-Dimensional Irreducible Modules for the Three-Point 2 Loop Algebra
• Theq-Tetrahedron Algebra and Its Finite Dimensional Irreducible Modules
• A family of tridiagonal pairs and related symmetric functions
• Onsager's algebra and superintegrability
• Crystal Statistics. I. A Two-Dimensional Model with an Order-Disorder Transition
• Two linear transformations each tridiagonal with respect to an eigenbasis of the other