Pages that link to "Item:Q2637156"
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The following pages link to Finite-dimensional irreducible \(U_q(\mathfrak{sl}_2)\)-modules from the equitable point of view (Q2637156):
Displaying 25 items.
- The algebra \(U_q(\mathfrak{sl}_2)\) in disguise (Q401216) (← links)
- Billiard arrays and finite-dimensional irreducible \(U_q(\mathfrak{sl}_2)\)-modules (Q406487) (← links)
- Lowering-raising triples and \(U_q(\mathfrak{sl}_2)\) (Q498312) (← links)
- Linear transformations that are tridiagonal with respect to the three decompositions for an LR triple (Q498313) (← links)
- Leonard pairs and quantum algebra \(U_q(sl_{2})\) (Q501251) (← links)
- Bidiagonal triples (Q513252) (← links)
- Finite dimensional simple modules of \((Q\),\textbf{Q})-current algebras (Q827049) (← links)
- An LR pair that can be extended to an LR triple (Q905722) (← links)
- Upper triangular matrices and billiard arrays (Q905741) (← links)
- On a \(q\)-analogue of the McKay correspondence and the ADE classification of \(\mathfrak{sl}_{2}\) conformal field theories (Q1865273) (← links)
- Tridiagonal pairs of \(q\)-Racah-type and the \(q\)-tetrahedron algebra (Q2022444) (← links)
- Freidel-Maillet type presentations of \(U_q(sl_2)\) (Q2075579) (← links)
- Some \(q\)-exponential formulas for finite-dimensional \(\square_q\)-modules (Q2188375) (← links)
- Equitable presentations for multiparameter quantum groups (Q2244672) (← links)
- Evaluation modules for the \(q\)-tetrahedron algebra (Q2451206) (← links)
- Whittaker modules for \(U_q(\mathfrak{sl}_2)\) (Q2488329) (← links)
- Indecomposable \(U_q(\text{sl}_n)\) modules for \(q^h=-1\) and BRS intertwiners (Q2755763) (← links)
- The Lusztig automorphism of Uq(𝔰𝔩2) from the equitable point of view (Q4594964) (← links)
- (Q4717438) (← links)
- (Q5003344) (← links)
- Leonard pairs generated from \(U_q(sl_2)\) (Q5046997) (← links)
- Bidiagonal triads and the tetrahedron algebra (Q5080228) (← links)
- Raising/Lowering Maps and Modules for the Quantum Affine Algebra (Q5756470) (← links)
- Twisting finite-dimensional modules for the \(q\)-Onsager algebra \(\mathcal{O}_q\) via the Lusztig automorphism (Q6158141) (← links)
- The \(\mathbb{Z}_3\)-symmetric down-up algebra (Q6565668) (← links)
