The ψS polar decomposition when the cosquare of S is normal

The ψS polar decomposition when the cosquare of S is normal

Let a nonsingular S ∈ Mn (C) be given. For a nonsingular A ∈ Mn (C), set ψS (A) = S−1A−1S. We say that an A is ψS orthogonal if ψS (A) = A−1 and we say that A is ψS symmetric if ψS (A) = A. For a possibly singular B ∈ Mn (C), we say that B is ψS orthogonal if S−1BS = B; we say that B has a ψS polar...

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Main Authors: Granario, Daryl Q., Merino, Dennis I., Paras, Agnes T.
Format: text
Published: Animo Repository 2016
Subjects:
Symmetric matrices
Decomposition (Mathematics)
Orthogonal decompositions
Mathematics
Online Access:https://animorepository.dlsu.edu.ph/faculty_research/11361
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Institution: De La Salle University
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spelling oai:animorepository.dlsu.edu.ph:faculty_research-133462023-12-02T00:36:11Z The ψS polar decomposition when the cosquare of S is normal Granario, Daryl Q. Merino, Dennis I. Paras, Agnes T. Let a nonsingular S ∈ Mn (C) be given. For a nonsingular A ∈ Mn (C), set ψS (A) = S−1A−1S. We say that an A is ψS orthogonal if ψS (A) = A−1 and we say that A is ψS symmetric if ψS (A) = A. For a possibly singular B ∈ Mn (C), we say that B is ψS orthogonal if S−1BS = B; we say that B has a ψS polar decomposition if B = RE for some (possibly singular) ψS orthogonal R and (necessarily nonsingular) ψS symmetric E. If S = I, then the ψS polar decomposition is the real-coninvolutory decomposition. We show that if A is nonsingular, then A has a ψS polar decomposition if and only if A commutes with SS. Because S is nonsingular, the cosquare of S (that is, S−T S) is normal if and only if SS is normal [11, Theorem 5.2]. In this case, we show that a possibly singular A ∈ Mn (C) has a ψS polar decomposition if and only if (a) rank (A) and rank SS − λI A have the same parity for every negative eigenvalue λ of SS, and (b) the ranges of SA and A are the same. 2016-01-01T08:00:00Z text https://animorepository.dlsu.edu.ph/faculty_research/11361 Faculty Research Work Animo Repository Symmetric matrices Decomposition (Mathematics) Orthogonal decompositions 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
topic Symmetric matrices
Decomposition (Mathematics)
Orthogonal decompositions
Mathematics
spellingShingle Symmetric matrices
Decomposition (Mathematics)
Orthogonal decompositions
Mathematics
Granario, Daryl Q.
Merino, Dennis I.
Paras, Agnes T.
The ψS polar decomposition when the cosquare of S is normal
description Let a nonsingular S ∈ Mn (C) be given. For a nonsingular A ∈ Mn (C), set ψS (A) = S−1A−1S. We say that an A is ψS orthogonal if ψS (A) = A−1 and we say that A is ψS symmetric if ψS (A) = A. For a possibly singular B ∈ Mn (C), we say that B is ψS orthogonal if S−1BS = B; we say that B has a ψS polar decomposition if B = RE for some (possibly singular) ψS orthogonal R and (necessarily nonsingular) ψS symmetric E. If S = I, then the ψS polar decomposition is the real-coninvolutory decomposition. We show that if A is nonsingular, then A has a ψS polar decomposition if and only if A commutes with SS. Because S is nonsingular, the cosquare of S (that is, S−T S) is normal if and only if SS is normal [11, Theorem 5.2]. In this case, we show that a possibly singular A ∈ Mn (C) has a ψS polar decomposition if and only if (a) rank (A) and rank SS − λI A have the same parity for every negative eigenvalue λ of SS, and (b) the ranges of SA and A are the same.
format text
author Granario, Daryl Q.
Merino, Dennis I.
Paras, Agnes T.
author_facet Granario, Daryl Q.
Merino, Dennis I.
Paras, Agnes T.
author_sort Granario, Daryl Q.
title The ψS polar decomposition when the cosquare of S is normal
title_short The ψS polar decomposition when the cosquare of S is normal
title_full The ψS polar decomposition when the cosquare of S is normal
title_fullStr The ψS polar decomposition when the cosquare of S is normal
title_full_unstemmed The ψS polar decomposition when the cosquare of S is normal
title_sort ψs polar decomposition when the cosquare of s is normal
publisher Animo Repository
publishDate 2016
url https://animorepository.dlsu.edu.ph/faculty_research/11361
_version_ 1784863534963752960

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