Linking the special orthogonal algebra so4 and the tetrahedron algebra

In 2007, B. Hartwig and Terwilliger found a presentation for the three-point sl2 loop algebra in terms of generators and relations. To obtain this presentation, they defined a Lie algebra by generators and relations and established an isomorphism from to three-point sl2 loop algebra. Essentially, ha...

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Main Author: Morales, John Vincent S.
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Online Access:https://animorepository.dlsu.edu.ph/faculty_research/11538
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spelling oai:animorepository.dlsu.edu.ph:faculty_research-117392024-03-18T06:14:19Z Linking the special orthogonal algebra so4 and the tetrahedron algebra Morales, John Vincent S. In 2007, B. Hartwig and Terwilliger found a presentation for the three-point sl2 loop algebra in terms of generators and relations. To obtain this presentation, they defined a Lie algebra by generators and relations and established an isomorphism from to three-point sl2 loop algebra. Essentially, has six generators which can be naturally identified with the six edges of the tetrahedron. In fact, each face of the tetrahedron has three surrounding edges which generate a subalgebra of that is isomorphic to sl2. It is interesting to know whether a direct sum of finitely many copies of sl2 (e.g., special orthogonal algebra so4) captures the bracket relations of the generators of . Here, we show that there exists a Lie algebra homomorphism φ : x → so4 which can be extended to a homomorphism φ : x → L where L is a direct sum of finitely many copies of sl2. We construct a finite-dimensional so4-module which is viewed as a -module via the homomorphism φ. We show how this so4-module is related to Krawtchouk polynomials. This paper is inspired by and is an extension of the work of Nomura and Terwilliger (2012) [19]. 2022-01-01T08:00:00Z text https://animorepository.dlsu.edu.ph/faculty_research/11538 info:doi/10.1016/j.laa.2021.12.009 Faculty Research Work Animo Repository Combinatorial designs and configurations Algebras, Linear Polynomials Algebra
institution De La Salle University
building De La Salle University Library
continent Asia
country Philippines
Philippines
content_provider De La Salle University Library
collection DLSU Institutional Repository
topic Combinatorial designs and configurations
Algebras, Linear
Polynomials
Algebra
spellingShingle Combinatorial designs and configurations
Algebras, Linear
Polynomials
Algebra
Morales, John Vincent S.
Linking the special orthogonal algebra so4 and the tetrahedron algebra
description In 2007, B. Hartwig and Terwilliger found a presentation for the three-point sl2 loop algebra in terms of generators and relations. To obtain this presentation, they defined a Lie algebra by generators and relations and established an isomorphism from to three-point sl2 loop algebra. Essentially, has six generators which can be naturally identified with the six edges of the tetrahedron. In fact, each face of the tetrahedron has three surrounding edges which generate a subalgebra of that is isomorphic to sl2. It is interesting to know whether a direct sum of finitely many copies of sl2 (e.g., special orthogonal algebra so4) captures the bracket relations of the generators of . Here, we show that there exists a Lie algebra homomorphism φ : x → so4 which can be extended to a homomorphism φ : x → L where L is a direct sum of finitely many copies of sl2. We construct a finite-dimensional so4-module which is viewed as a -module via the homomorphism φ. We show how this so4-module is related to Krawtchouk polynomials. This paper is inspired by and is an extension of the work of Nomura and Terwilliger (2012) [19].
format text
author Morales, John Vincent S.
author_facet Morales, John Vincent S.
author_sort Morales, John Vincent S.
title Linking the special orthogonal algebra so4 and the tetrahedron algebra
title_short Linking the special orthogonal algebra so4 and the tetrahedron algebra
title_full Linking the special orthogonal algebra so4 and the tetrahedron algebra
title_fullStr Linking the special orthogonal algebra so4 and the tetrahedron algebra
title_full_unstemmed Linking the special orthogonal algebra so4 and the tetrahedron algebra
title_sort linking the special orthogonal algebra so4 and the tetrahedron algebra
publisher Animo Repository
publishDate 2022
url https://animorepository.dlsu.edu.ph/faculty_research/11538
_version_ 1794553700731060224