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Noncommutative geodesics and the KSGNS construction
Edwin Beggs 
Journal of Geometry and Physics, Volume: 158, Start page: 103851
Swansea University Author:
Edwin Beggs
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DOI (Published version): 10.1016/j.geomphys.2020.103851
Abstract
We study geodesics in noncommutative geometry by means of bimodule connections and completely positive maps using the Kasparov, Stinespring, Gel’fand, Naĭmark & Segal (KSGNS) construction. This is motivated from classical geometry, and we also consider examples on the algebras M_2 and C(Z_n)thou...
| Published in: | Journal of Geometry and Physics |
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| ISSN: | 0393-0440 |
| Published: |
Elsevier BV
2020
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| URI: | https://cronfa.swan.ac.uk/Record/cronfa54891 |
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2020-12-09T11:42:58.9694495 v2 54891 2020-08-06 Noncommutative geodesics and the KSGNS construction a0062e7cf6d68f05151560cdf9d14e75 0000-0002-3139-0983 Edwin Beggs Edwin Beggs true false 2020-08-06 SMA We study geodesics in noncommutative geometry by means of bimodule connections and completely positive maps using the Kasparov, Stinespring, Gel’fand, Naĭmark & Segal (KSGNS) construction. This is motivated from classical geometry, and we also consider examples on the algebras M_2 and C(Z_n)though restricting to classical time. On the way we have to consider the reality of a noncommutative vector field, and for this we propose a definition depending on a state on the algebra. Journal Article Journal of Geometry and Physics 158 103851 Elsevier BV 0393-0440 Noncommutative geometry; Differential geometry; Geodesic; Positive map; Hilbert C*module 1 12 2020 2020-12-01 10.1016/j.geomphys.2020.103851 COLLEGE NANME Mathematics COLLEGE CODE SMA Swansea University 2020-12-09T11:42:58.9694495 2020-08-06T13:11:08.8293308 Faculty of Science and Engineering School of Mathematics and Computer Science - Mathematics Edwin Beggs 0000-0002-3139-0983 1 54891__17875__c7a3f08fb8dd4abab0938d45f17c3cb1.pdf GeodesicSubmit.pdf 2020-08-06T13:13:14.2581696 Output 691285 application/pdf Accepted Manuscript true 2021-08-05T00:00:00.0000000 Released under the terms of a Creative Commons Attribution Non-Commercial No Derivatives License (CC-BY-NC-ND). true English |
| title |
Noncommutative geodesics and the KSGNS construction |
| spellingShingle |
Noncommutative geodesics and the KSGNS construction Edwin Beggs |
| title_short |
Noncommutative geodesics and the KSGNS construction |
| title_full |
Noncommutative geodesics and the KSGNS construction |
| title_fullStr |
Noncommutative geodesics and the KSGNS construction |
| title_full_unstemmed |
Noncommutative geodesics and the KSGNS construction |
| title_sort |
Noncommutative geodesics and the KSGNS construction |
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a0062e7cf6d68f05151560cdf9d14e75 |
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a0062e7cf6d68f05151560cdf9d14e75_***_Edwin Beggs |
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Edwin Beggs |
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Edwin Beggs |
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Journal article |
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Journal of Geometry and Physics |
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158 |
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103851 |
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2020 |
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Swansea University |
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0393-0440 |
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10.1016/j.geomphys.2020.103851 |
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Elsevier BV |
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Faculty of Science and Engineering |
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| description |
We study geodesics in noncommutative geometry by means of bimodule connections and completely positive maps using the Kasparov, Stinespring, Gel’fand, Naĭmark & Segal (KSGNS) construction. This is motivated from classical geometry, and we also consider examples on the algebras M_2 and C(Z_n)though restricting to classical time. On the way we have to consider the reality of a noncommutative vector field, and for this we propose a definition depending on a state on the algebra. |
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2020-12-01T04:08:43Z |
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1763753615388835840 |
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10.997433 |