A factorization theorem for 4x4 symplectic matrices

Let A∈GL(n,ℂ). Let S1={β1,β2,...,βn} and S2={γ1,γ2,...,γn} be subsets of ℂ\{0}. We say that A realizes (S1,S2) if there exist B,C∈GL(n,ℂ) such that A=BC with σ(B)=S1 and σ(C)=S2. If both B,C are from a subgroup G≤GL(n,ℂ), we say that (S1,S2) is realized by A in G. Sourour showed that if S1={β1,β2,.....

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Main Author:	Hernandez, Mary Recylee D.
Format:	text
Language:	English
Published:	Animo Repository 2023
Subjects:	Factorization (Mathematics) Matrices Mathematics
Online Access:	https://animorepository.dlsu.edu.ph/etdm_math/9 https://animorepository.dlsu.edu.ph/context/etdm_math/article/1008/viewcontent/2023_Hernandez_A_factorization_theorem_for_4x4_symplectic_matrices_Full_text.pdf
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Institution:	De La Salle University
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spelling	oai:animorepository.dlsu.edu.ph:etdm_math-10082023-08-12T07:17:08Z A factorization theorem for 4x4 symplectic matrices Hernandez, Mary Recylee D. Let A∈GL(n,ℂ). Let S1={β1,β2,...,βn} and S2={γ1,γ2,...,γn} be subsets of ℂ\{0}. We say that A realizes (S1,S2) if there exist B,C∈GL(n,ℂ) such that A=BC with σ(B)=S1 and σ(C)=S2. If both B,C are from a subgroup G≤GL(n,ℂ), we say that (S1,S2) is realized by A in G. Sourour showed that if S1={β1,β2,...,βn} and S2={γ1,γ2,...,γn}⊆𝔽\{0} are given, a nonscalar A∈GL(n,𝔽) realizes (S1,S2) if and only if det A=Π_(j=1)^n βjγj. We take G to be the 2nx2n symplectic group Sp(2n,ℂ) and determine if there exists pair of sets (S1,S2) which are realizable by a matrix A∈Sp(4,ℂ). 2023-01-01T08:00:00Z text application/pdf https://animorepository.dlsu.edu.ph/etdm_math/9 https://animorepository.dlsu.edu.ph/context/etdm_math/article/1008/viewcontent/2023_Hernandez_A_factorization_theorem_for_4x4_symplectic_matrices_Full_text.pdf Mathematics and Statistics Master's Theses English Animo Repository Factorization (Mathematics) Matrices Mathematics
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
language	English
topic	Factorization (Mathematics) Matrices Mathematics
spellingShingle	Factorization (Mathematics) Matrices Mathematics Hernandez, Mary Recylee D. A factorization theorem for 4x4 symplectic matrices
description	Let A∈GL(n,ℂ). Let S1={β1,β2,...,βn} and S2={γ1,γ2,...,γn} be subsets of ℂ\{0}. We say that A realizes (S1,S2) if there exist B,C∈GL(n,ℂ) such that A=BC with σ(B)=S1 and σ(C)=S2. If both B,C are from a subgroup G≤GL(n,ℂ), we say that (S1,S2) is realized by A in G. Sourour showed that if S1={β1,β2,...,βn} and S2={γ1,γ2,...,γn}⊆𝔽\{0} are given, a nonscalar A∈GL(n,𝔽) realizes (S1,S2) if and only if det A=Π_(j=1)^n βjγj. We take G to be the 2nx2n symplectic group Sp(2n,ℂ) and determine if there exists pair of sets (S1,S2) which are realizable by a matrix A∈Sp(4,ℂ).
format	text
author	Hernandez, Mary Recylee D.
author_facet	Hernandez, Mary Recylee D.
author_sort	Hernandez, Mary Recylee D.
title	A factorization theorem for 4x4 symplectic matrices
title_short	A factorization theorem for 4x4 symplectic matrices
title_full	A factorization theorem for 4x4 symplectic matrices
title_fullStr	A factorization theorem for 4x4 symplectic matrices
title_full_unstemmed	A factorization theorem for 4x4 symplectic matrices
title_sort	factorization theorem for 4x4 symplectic matrices
publisher	Animo Repository
publishDate	2023
url	https://animorepository.dlsu.edu.ph/etdm_math/9 https://animorepository.dlsu.edu.ph/context/etdm_math/article/1008/viewcontent/2023_Hernandez_A_factorization_theorem_for_4x4_symplectic_matrices_Full_text.pdf
_version_	1775631144338849792

A factorization theorem for 4x4 symplectic matrices

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