On 3-Dimensional contact metric manifolds
Use this link to cite this item : http://doi.org/10.15027/149
| ID | 149 |
| file | |
| creator |
Kim, Byung Hak
Choi, Jin Hyuk
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| subject | Conformal curvature tensor
almost contact metric manifold
space of constant curvature
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| NDC |
Mathematics
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| abstract | Let M be a 3-dimensional almost contact metric manifold satisfying (*)-condition. We denote such amanifold by M*. We prove that if M* is -Einstein, then M* is either Sasakian or cosymplectic manifold, andis a space of constant curvature. Consequently M* is either flat or isometric to the 3-dimensional unit sphereif M* is complete and simply connected.
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| journal title |
Memoirs of the Faculty of Integrated Arts and Sciences, Hiroshima University. IV, Science reports
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| volume | Volume 28
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| start page | 29
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| end page | 33
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| date of issued | 2002-12
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| publisher | 広島大学総合科学部
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| contributor | 国立情報学研究所
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| issn | 1340-8364
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| ncid | |
| SelfDOI | |
| language |
eng
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| nii type |
Departmental Bulletin Paper
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| HU type |
Departmental Bulletin Papers
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| DCMI type | text
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| format | application/pdf
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| text version | publisher
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| department |
Graduate School of Integrated Arts and Sciences
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| 他の一覧 |
