Constructions of self-dual (2,2)-metrics
スポンサーリンク
概要
- 論文の詳細を見る
We discuss (anti-) self-dual (2,2)-metrics on four-dimensional manifolds. Comparing with (4,0)-metrics of Bianchi type IX, we globally construct such (2,2)-metrics of Bianchi type VIII: (1) Fubini-Study type, (2) Eguchi-Hanson type, (3) Taub-NUT type and (4) LeBrun type.
- 沼津工業高等専門学校の論文
- 1995-01-31
著者
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Kamada Hiroyuki
Numazu College Of Technology
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MACHIDA Yoshinori
Numazu College of Technology
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鎌田 博行
Numazu College of Technology
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待田 芳徳
Numazu College of Technology
関連論文
- Self-dual Kahler metrics of neutral signature on complex surfaces
- Constructions of self-dual (2,2)-metrics
- Self-duality of metrics of type (2,2) on four-dimensional manifolds
- Twistor spaces for real four-dimensional Lorentzian manifolds
- Twistor theory of manifolds with Grassmannian structures
- On the Relation Between Some Properties of Geodesics and the Integrability of Geodesic Flows
- ON FOUR-DIMENSIONAL SPACE-TIMES AND TWISTOR THEORY
- The Integrability of Geodesic Flows on Some Non-Compact Manifolds