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Elucidation of covariant proofs in general relativity: example of the use of algebraic software in the shear-free conjecture in MAPLE
In this paper we explore the use of a new algebraic software package in providing independent covariant proof of a conjecture in general relativity. We examine the proof of two sub-cases of the shear-free conjecture σ = 0 = > ω Θ = 0 by Senovilla et al. (Gen. Relativ. Gravit 30:389–411, 1998 ): c...
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| Published in: | General relativity and gravitation 2018, Vol.50 (1), p.1-23, Article 5 |
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| creator | Huf, P. A. Carminati, J. |
| description | In this paper we explore the use of a new algebraic software package in providing independent covariant proof of a conjecture in general relativity. We examine the proof of two sub-cases of the shear-free conjecture
σ
=
0
=
>
ω
Θ
=
0
by Senovilla et al. (Gen. Relativ. Gravit 30:389–411,
1998
): case 1: for dust; case 2: for acceleration parallel to vorticity. We use TensorPack, a software package recently released for the Maple environment. In this paper, we briefly summarise the key features of the software and then demonstrate its use by providing and discussing examples of independent proofs of the paper in question. A full set of our completed proofs is available online at
http://www.bach2roq.com/science/maths/GR/ShearFreeProofs.html
. We are in agreeance with the equations provided in the original paper, noting that the proofs often require many steps. Furthermore, in our proofs we provide fully worked algebraic steps in such a way that the proofs can be examined systematically, and avoiding hand calculation. It is hoped that the elucidated proofs may be of use to other researchers in verifying the algebraic consistency of the expressions in the paper in question, as well as related literature. Furthermore we suggest that the appropriate use of algebraic software in covariant formalism could be useful for developing research and teaching in GR theory. |
| doi_str_mv | 10.1007/s10714-017-2325-5 |
| format | article |
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σ
=
0
=
>
ω
Θ
=
0
by Senovilla et al. (Gen. Relativ. Gravit 30:389–411,
1998
): case 1: for dust; case 2: for acceleration parallel to vorticity. We use TensorPack, a software package recently released for the Maple environment. In this paper, we briefly summarise the key features of the software and then demonstrate its use by providing and discussing examples of independent proofs of the paper in question. A full set of our completed proofs is available online at
http://www.bach2roq.com/science/maths/GR/ShearFreeProofs.html
. We are in agreeance with the equations provided in the original paper, noting that the proofs often require many steps. Furthermore, in our proofs we provide fully worked algebraic steps in such a way that the proofs can be examined systematically, and avoiding hand calculation. It is hoped that the elucidated proofs may be of use to other researchers in verifying the algebraic consistency of the expressions in the paper in question, as well as related literature. Furthermore we suggest that the appropriate use of algebraic software in covariant formalism could be useful for developing research and teaching in GR theory.</description><identifier>ISSN: 0001-7701</identifier><identifier>EISSN: 1572-9532</identifier><identifier>DOI: 10.1007/s10714-017-2325-5</identifier><language>eng</language><publisher>New York: Springer US</publisher><subject>Algebra ; Astronomy ; Astrophysics and Cosmology ; Classical and Quantum Gravitation ; Differential Geometry ; Gravity ; Mathematical and Computational Physics ; Physics ; Physics and Astronomy ; Program verification (computers) ; Quantum Physics ; Relativity ; Relativity Theory ; Research Article ; Software ; Software packages ; Theoretical ; Theory of relativity ; Vorticity</subject><ispartof>General relativity and gravitation, 2018, Vol.50 (1), p.1-23, Article 5</ispartof><rights>Springer Science+Business Media, LLC, part of Springer Nature 2017</rights><rights>Copyright Springer Science & Business Media 2018</rights><lds50>peer_reviewed</lds50><woscitedreferencessubscribed>false</woscitedreferencessubscribed><citedby>FETCH-LOGICAL-c316t-5e293d4c3f50687db2277d69cf5f6b8a295c1ee02ab27ed33ada96e170dd710a3</citedby><cites>FETCH-LOGICAL-c316t-5e293d4c3f50687db2277d69cf5f6b8a295c1ee02ab27ed33ada96e170dd710a3</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>314,780,784,27924,27925</link.rule.ids></links><search><creatorcontrib>Huf, P. A.</creatorcontrib><creatorcontrib>Carminati, J.</creatorcontrib><title>Elucidation of covariant proofs in general relativity: example of the use of algebraic software in the shear-free conjecture in MAPLE</title><title>General relativity and gravitation</title><addtitle>Gen Relativ Gravit</addtitle><description>In this paper we explore the use of a new algebraic software package in providing independent covariant proof of a conjecture in general relativity. We examine the proof of two sub-cases of the shear-free conjecture
σ
=
0
=
>
ω
Θ
=
0
by Senovilla et al. (Gen. Relativ. Gravit 30:389–411,
1998
): case 1: for dust; case 2: for acceleration parallel to vorticity. We use TensorPack, a software package recently released for the Maple environment. In this paper, we briefly summarise the key features of the software and then demonstrate its use by providing and discussing examples of independent proofs of the paper in question. A full set of our completed proofs is available online at
http://www.bach2roq.com/science/maths/GR/ShearFreeProofs.html
. We are in agreeance with the equations provided in the original paper, noting that the proofs often require many steps. Furthermore, in our proofs we provide fully worked algebraic steps in such a way that the proofs can be examined systematically, and avoiding hand calculation. It is hoped that the elucidated proofs may be of use to other researchers in verifying the algebraic consistency of the expressions in the paper in question, as well as related literature. Furthermore we suggest that the appropriate use of algebraic software in covariant formalism could be useful for developing research and teaching in GR theory.</description><subject>Algebra</subject><subject>Astronomy</subject><subject>Astrophysics and Cosmology</subject><subject>Classical and Quantum Gravitation</subject><subject>Differential Geometry</subject><subject>Gravity</subject><subject>Mathematical and Computational Physics</subject><subject>Physics</subject><subject>Physics and Astronomy</subject><subject>Program verification (computers)</subject><subject>Quantum Physics</subject><subject>Relativity</subject><subject>Relativity Theory</subject><subject>Research Article</subject><subject>Software</subject><subject>Software packages</subject><subject>Theoretical</subject><subject>Theory of relativity</subject><subject>Vorticity</subject><issn>0001-7701</issn><issn>1572-9532</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2018</creationdate><recordtype>article</recordtype><recordid>eNp1kL9OwzAQhy0EEqXwAGyWmA0-u44bNlSVP1IRDDBbrnNuU4Wk2EmhD8B74xAGFiafdd93p_sRcg78EjjXVxG4hgnjoJmQQjF1QEagtGC5kuKQjDjnwLTmcExOYtykb64zPSJf86pzZWHbsqlp46lrdjaUtm7pNjSNj7Ss6QprDLaiAavE7cp2f03x075tK-yVdo20iz-lrVa4DLZ0NDa-_bABe78H4hptYD4gphX1Bl3bDc3Hm-fF_JQceVtFPPt9x-T1dv4yu2eLp7uH2c2COQlZyxSKXBYTJ73i2VQXSyG0LrLceeWz5dSKXDlA5MIuhcZCSlvYPEPQvCg0cCvH5GKYm4577zC2ZtN0oU4rDeQaxFSAzBIFA-VCE2NAb7ahfLNhb4CbPm0zpG1S2qZP26jkiMGJia1XGP5M_lf6BlcXg7A</recordid><startdate>2018</startdate><enddate>2018</enddate><creator>Huf, P. A.</creator><creator>Carminati, J.</creator><general>Springer US</general><general>Springer Nature B.V</general><scope>AAYXX</scope><scope>CITATION</scope></search><sort><creationdate>2018</creationdate><title>Elucidation of covariant proofs in general relativity: example of the use of algebraic software in the shear-free conjecture in MAPLE</title><author>Huf, P. A. ; Carminati, J.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c316t-5e293d4c3f50687db2277d69cf5f6b8a295c1ee02ab27ed33ada96e170dd710a3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2018</creationdate><topic>Algebra</topic><topic>Astronomy</topic><topic>Astrophysics and Cosmology</topic><topic>Classical and Quantum Gravitation</topic><topic>Differential Geometry</topic><topic>Gravity</topic><topic>Mathematical and Computational Physics</topic><topic>Physics</topic><topic>Physics and Astronomy</topic><topic>Program verification (computers)</topic><topic>Quantum Physics</topic><topic>Relativity</topic><topic>Relativity Theory</topic><topic>Research Article</topic><topic>Software</topic><topic>Software packages</topic><topic>Theoretical</topic><topic>Theory of relativity</topic><topic>Vorticity</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Huf, P. A.</creatorcontrib><creatorcontrib>Carminati, J.</creatorcontrib><collection>CrossRef</collection><jtitle>General relativity and gravitation</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Huf, P. A.</au><au>Carminati, J.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Elucidation of covariant proofs in general relativity: example of the use of algebraic software in the shear-free conjecture in MAPLE</atitle><jtitle>General relativity and gravitation</jtitle><stitle>Gen Relativ Gravit</stitle><date>2018</date><risdate>2018</risdate><volume>50</volume><issue>1</issue><spage>1</spage><epage>23</epage><pages>1-23</pages><artnum>5</artnum><issn>0001-7701</issn><eissn>1572-9532</eissn><abstract>In this paper we explore the use of a new algebraic software package in providing independent covariant proof of a conjecture in general relativity. We examine the proof of two sub-cases of the shear-free conjecture
σ
=
0
=
>
ω
Θ
=
0
by Senovilla et al. (Gen. Relativ. Gravit 30:389–411,
1998
): case 1: for dust; case 2: for acceleration parallel to vorticity. We use TensorPack, a software package recently released for the Maple environment. In this paper, we briefly summarise the key features of the software and then demonstrate its use by providing and discussing examples of independent proofs of the paper in question. A full set of our completed proofs is available online at
http://www.bach2roq.com/science/maths/GR/ShearFreeProofs.html
. We are in agreeance with the equations provided in the original paper, noting that the proofs often require many steps. Furthermore, in our proofs we provide fully worked algebraic steps in such a way that the proofs can be examined systematically, and avoiding hand calculation. It is hoped that the elucidated proofs may be of use to other researchers in verifying the algebraic consistency of the expressions in the paper in question, as well as related literature. Furthermore we suggest that the appropriate use of algebraic software in covariant formalism could be useful for developing research and teaching in GR theory.</abstract><cop>New York</cop><pub>Springer US</pub><doi>10.1007/s10714-017-2325-5</doi><tpages>23</tpages></addata></record> |
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| subjects | Algebra Astronomy Astrophysics and Cosmology Classical and Quantum Gravitation Differential Geometry Gravity Mathematical and Computational Physics Physics Physics and Astronomy Program verification (computers) Quantum Physics Relativity Relativity Theory Research Article Software Software packages Theoretical Theory of relativity Vorticity |
| title | Elucidation of covariant proofs in general relativity: example of the use of algebraic software in the shear-free conjecture in MAPLE |
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