On standard bases of irreducible modules of Terwilliger algebras of Doob schemes
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Publication:6083978
DOI10.1007/s10801-023-01227-5zbMath1525.05198MaRDI QIDQ6083978
Publication date: 31 October 2023
Published in: Journal of Algebraic Combinatorics (Search for Journal in Brave)
Terwilliger algebraKrawtchouk polynomialsspecial orthogonal Lie algebratetrahedron algebrasymmetric association schemesDoob schemes
Association schemes, strongly regular graphs (05E30) Orthogonal polynomials and functions of hypergeometric type (Jacobi, Laguerre, Hermite, Askey scheme, etc.) (33C45) Graphs and linear algebra (matrices, eigenvalues, etc.) (05C50) Linear transformations, semilinear transformations (15A04)
Cites Work
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- Distance-regular graphs
- Krawtchouk polynomials, the Lie algebra \(\mathfrak{sl}_2\), and Leonard pairs
- An action of the tetrahedron algebra on the standard module for the Hamming graphs and Doob graphs
- On Lee association schemes over \(\mathbb{Z}_4\) and their Terwilliger algebra
- On bipartite distance-regular graphs with exactly two irreducible T-modules with endpoint two
- The irreducible modules of the Terwilliger algebras of Doob schemes
- The subconstituent algebra of an association scheme. I
- The subconstituent algebra of an association scheme. III
- The subconstituent algebra of an association scheme. II
- On the Terwilliger algebra of bipartite distance-regular graphs with \(\Delta_2 = 0\) and \(c_2 = 2\)
- On quantum adjacency algebras of Doob graphs and their irreducible modules
- The tetrahedron algebra and its finite-dimensional irreducible modules
- The tetrahedron algebra, the Onsager algebra, and the \(\mathfrak{sl}_2\) loop algebra
- Quantum probability and spectral analysis of graphs. With a foreword by Professor Luigi Accardi.
- Terwilliger algebras of wreath products of association schemes
- The structure of a tridiagonal pair
- Commutative association schemes
- The shape of a tridiagonal pair.
- An \(A\)-invariant subspace for bipartite distance-regular graphs with exactly two irreducible \(T\)-modules with endpoint 2, both thin
- On bipartite \(Q\)-polynomial distance-regular graphs with diameter 9, 10, or 11
- The Terwilliger algebra of an almost-bipartite \(P\)- and \(Q\)-polynomial association scheme
- The Terwilliger algebra of a distance-regular graph that supports a spin model
- The Terwilliger algebra of the incidence graph of the Hamming graph
- A family of tridiagonal pairs
- The quantum adjacency algebra and subconstituent algebra of a graph
- The isomorphism problem of trees from the viewpoint of Terwilliger algebras
- Linking the special orthogonal algebra \(\mathfrak{so}_4\) and the tetrahedron algebra \(\boxtimes \)
- On the Terwilliger algebra of distance-biregular graphs
- The Terwilliger algebras of Grassmann graphs
- The Terwilliger algebra of the Grassmann scheme \(J_q(N,D)\) revisited from the viewpoint of the quantum affine algebra \(U_q(\hat{\mathfrak{sl}}_2)\)
- The Terwilliger algebra of the Johnson scheme \(J(N, D)\) revisited from the viewpoint of group representations
- On bipartite distance-regular graphs with exactly one non-thin \(T\)-module with endpoint two
- Tridiagonal pairs and the quantum affine algebra \(U_q(\widehat{\text{sl}}_2)\).
- The Terwilliger algebras of Johnson graphs
- Tridiagonal pairs of Krawtchouk type
- A refinement of the split decomposition of a tridiagonal pair
- The Terwilliger algebra of a Hamming scheme \(H(d,q)\)
- TWO RELATIONS THAT GENERALIZE THE Q-SERRE RELATIONS AND THE DOLAN-GRADY RELATIONS
- The Rahman polynomials and the Lie algebra $\mathfrak{sl}_{3}(\mathbb{C})$
- Hypergeometric Orthogonal Polynomials and Their q-Analogues
- TWO NON-NILPOTENT LINEAR TRANSFORMATIONS THAT SATISFY THE CUBIC q-SERRE RELATIONS
- A family of tridiagonal pairs related to the quantum affine algebra U_q(sl_2)
- On a certain class of 1-thin distance-regular graphs
- The $S_4$-action on tetrahedron algebra
- Introduction to Lie Algebras and Representation Theory
- Crystal Statistics. I. A Two-Dimensional Model with an Order-Disorder Transition
- On the Terwilliger algebra of bipartite distance-regular graphs with \(\Delta_{2}=0\) and \(c_{2}=1\)
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