The Terwilliger algebra of the hypercube
We give an introduction to the Terwilliger algebra of a distance-regular graph, focusing on the hypercube QDof dimension D. Let X denote the vertex set ofQD . Fix a vertex x ∈ X, and letT = T(x) denote the associated Terwilliger algebra. We show thatT is the subalgebra of MatX(C) generated by the ad...
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2002
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oai:animorepository.dlsu.edu.ph:faculty_research-71892022-07-28T01:16:41Z The Terwilliger algebra of the hypercube Go, Junie T. We give an introduction to the Terwilliger algebra of a distance-regular graph, focusing on the hypercube QDof dimension D. Let X denote the vertex set ofQD . Fix a vertex x ∈ X, and letT = T(x) denote the associated Terwilliger algebra. We show thatT is the subalgebra of MatX(C) generated by the adjacency matrixA and a diagonal matrix A * = A * (x), where A * has yy entryD − 2 ∂(x, y) for all y ∈ X , and where ∂ denotes the path-length distance function. We show that A andA * satisfy A2A * − 2AA * A + A * A2& = & 4A * , A * 2A − 2A * AA * + AA * 2& = & 4 A. Using the above equations, we find the irreducible T -modules. For each irreducible T -module W, we display two orthogonal bases, which we call the standard basis and the dual standard basis. We describe the action of A andA * on each of these bases. We give the transition matrix from the standard basis to the dual standard basis for W. We compute the multiplicity with which each irreducible T -module W appears inCX . We give an elementary proof that QDhas the Q -polynomial property. We show that T is a homomorphic image of the universal enveloping algebra of the Lie algebrasl2 (C). We obtain an element φ of T that generates the center ofT . We obtain the central primitive idempotents of T as polynomials in φ. 2002-05-01T07:00:00Z text https://animorepository.dlsu.edu.ph/faculty_research/6301 Faculty Research Work Animo Repository Hypercube Matrices Algebra |
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Hypercube Matrices Algebra |
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Hypercube Matrices Algebra Go, Junie T. The Terwilliger algebra of the hypercube |
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We give an introduction to the Terwilliger algebra of a distance-regular graph, focusing on the hypercube QDof dimension D. Let X denote the vertex set ofQD . Fix a vertex x ∈ X, and letT = T(x) denote the associated Terwilliger algebra. We show thatT is the subalgebra of MatX(C) generated by the adjacency matrixA and a diagonal matrix A * = A * (x), where A * has yy entryD − 2 ∂(x, y) for all y ∈ X , and where ∂ denotes the path-length distance function. We show that A andA * satisfy A2A * − 2AA * A + A * A2& = & 4A * , A * 2A − 2A * AA * + AA * 2& = & 4 A. Using the above equations, we find the irreducible T -modules. For each irreducible T -module W, we display two orthogonal bases, which we call the standard basis and the dual standard basis. We describe the action of A andA * on each of these bases. We give the transition matrix from the standard basis to the dual standard basis for W. We compute the multiplicity with which each irreducible T -module W appears inCX . We give an elementary proof that QDhas the Q -polynomial property. We show that T is a homomorphic image of the universal enveloping algebra of the Lie algebrasl2 (C). We obtain an element φ of T that generates the center ofT . We obtain the central primitive idempotents of T as polynomials in φ. |
| format |
text |
| author |
Go, Junie T. |
| author_facet |
Go, Junie T. |
| author_sort |
Go, Junie T. |
| title |
The Terwilliger algebra of the hypercube |
| title_short |
The Terwilliger algebra of the hypercube |
| title_full |
The Terwilliger algebra of the hypercube |
| title_fullStr |
The Terwilliger algebra of the hypercube |
| title_full_unstemmed |
The Terwilliger algebra of the hypercube |
| title_sort |
terwilliger algebra of the hypercube |
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Animo Repository |
| publishDate |
2002 |
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https://animorepository.dlsu.edu.ph/faculty_research/6301 |
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1767196525850525696 |