Spin models and distance-regular graphs of \(q\)-Racah type
From MaRDI portal
Publication:6655691
DOI10.1016/j.ejc.2024.104069MaRDI QIDQ6655691
Paul M. Terwilliger, Nomura, Kazumasa
Publication date: 27 December 2024
Published in: European Journal of Combinatorics (Search for Journal in Brave)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Distance-regular graphs
- The universal Askey-Wilson algebra
- The universal Askey-Wilson algebra and the equitable presentation of \(U_{q}(sl_{2})\)
- Leonard triples of \(q\)-Racah type and their pseudo intertwiners
- Double affine Hecke algebras of rank 1 and the \(\mathbb Z_3\)-symmetric Askey-Wilson relations
- Homogeneity of a distance-regular graph which supports a spin model
- The classification of Leonard triples of QRacah type
- An algebra associated with a spin model
- The subconstituent algebra of an association scheme. I
- The subconstituent algebra of an association scheme. III
- The subconstituent algebra of an association scheme. II
- Structure of thin irreducible modules of a \(Q\)-polynomial distance-regular graph
- Finite-dimensional irreducible modules of the universal Askey-Wilson algebra
- Modular Leonard triples
- On knot invariants related to some statistical mechanical models
- Distance-regular graphs of \(q\)-Racah type and the \(q\)-tetrahedron algebra
- An analog of the Sklyanin algebra
- ``Hidden symmetry of Askey-Wilson polynomials
- Strongly regular graphs and spin models for the Kauffman polynomial
- Distance-regular graphs which support a spin model are thin
- Some formulas for spin models on distance-regular graphs
- Homogeneous graphs and regular near polygons
- Spin models on finite cyclic groups
- Representations of the cyclically symmetric \(q\)-deformed algebra \(U_q(\text{so}_3)\)
- 2-homogeneous bipartite distance-regular graphs
- The Lusztig automorphism of the \(q\)-Onsager algebra
- The Terwilliger algebra of a distance-regular graph that supports a spin model
- Spin models on bipartite distance-regular graphs
- Leonard pairs, spin models, and distance-regular graphs
- Tridiagonal pairs of \(q\)-Racah-type and the \(q\)-tetrahedron algebra
- The Norton algebra of a \(Q\)-polynomial distance-regular graph
- Algebraic combinatorics. Translated from the Japanese
- Spin Leonard pairs
- An embedding of the universal Askey-Wilson algebra into \(\operatorname{U}_q(\mathfrak{sl}_2) \otimes U_q(\mathfrak{sl}_2) \otimes U_q(\mathfrak{sl}_2)\)
- The universal Askey-Wilson algebra and DAHA of type \((C_{1}^{\vee },C_{1})\)
- Distance-regular graphs of \(q\)-Racah type and the universal Askey-Wilson algebra
- A simple group of order 44,352,000
- TWO RELATIONS THAT GENERALIZE THE Q-SERRE RELATIONS AND THE DOLAN-GRADY RELATIONS
- Quantum deformations of SU(2)
- THE AUGMENTED TRIDIAGONAL ALGEBRA
- GENERALIZED SPIN MODELS
- LEONARD PAIRS AND THE ASKEY–WILSON RELATIONS
- Braid group and 𝑞-Racah polynomials
- A diagram associated with the subconstituent algebra of a distance-regular graph
- The Askey–Wilson algebra and its avatars
- Spin models constructed from Hadamard matrices
- Askey-Wilson braid algebra and centralizer of \(U_q (\mathfrak{sl}_2)\)
- Twisting finite-dimensional modules for the \(q\)-Onsager algebra \(\mathcal{O}_q\) via the Lusztig automorphism
- Distance-regular graphs, the subconstituent algebra, and the $Q$-polynomial property
This page was built for publication: Spin models and distance-regular graphs of \(q\)-Racah type
