| ID | 105 |
| 著者 |
一條, 義博
Department of Mathematical Science, Faculty of Integrated Arts and Sciences, The University of Tokushima
|
| 資料タイプ |
紀要論文
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| 抄録 | In the present paper, continued the preceding paper [10], we are mainly concerned with a Kaehlerian Finsler manifold (M, f, g). First, in the Kaehlerian Finsler manifold, we define a generalized Finsler metric g^^~ by g^^~=(g+^tfgf)/2. We investigate the relation between the Finsler metric g, the generalized Finsler metric g^^~, the complex structure f and several Finsler connections derived from g and g^^~. In consequence of it, we obtain that the Kaehlerian Finsler manifold is a Landsberg space and the generalized Finsler metric g^^~ can be regarded as a real representation of a complex Finsler metric in a sense. Finally we find a necessary and sufficient condition for an Hermitian structure on the tangent bundle over a Kaehlerian Finsler manifold to be a Kaehler structure.
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| 掲載誌名 |
Journal of mathematics, Tokushima University
|
| ISSN | 00754293
|
| cat書誌ID | AA00701816
|
| 巻 | 28
|
| 開始ページ | 19
|
| 終了ページ | 27
|
| 並び順 | 19
|
| 発行日 | 1995-02-20
|
| 備考 | 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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| フルテキストファイル | |
| 言語 |
eng
|
