| ID | 47 |
| Author |
Ishihara, Toru
Department of Mathematics Faculty of Education Tokushima University
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| Content Type |
Departmental Bulletin Paper
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| Description | Let M be an m dimensional smooth Riemannian manifold with metric g. The tangent bundle T(M) over M is endowed with the Riemannian metric g^D, the diagonal lift of g [3], [5]. Let X be a vector field on M. Then it is regarded as a mapping φx of M to T(M). The purpose of this paper is to study under what conditions the mapping φx of Riemannian manifolds is harmonic. § 1 is devoted to describe some basic facts on geometry of tangent bundles. We will see in §2 that the natural projection, π: T(M)→M is a totally geodesic submersion. In the last section, it is proved that when M is compact and orientable, φx: M→T(M) is harmonic iff the first covariant derivative of X vanishes.
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| Journal Title |
Journal of mathematics, Tokushima University
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| ISSN | 00754293
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| NCID | AA00701816
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| Volume | 13
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| Start Page | 23
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| End Page | 27
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| Sort Key | 23
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| Published Date | 1979-11-30
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| Remark | 公開日:2010年1月24日で登録したコンテンツは、国立情報学研究所において電子化したものです。
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| FullText File | |
| language |
eng
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| departments |
Science and Technology
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