幾何構造と無限可積分系

几何结构和无限可积系统

• 批准号: 08211256
• 负责人: 神島 芳宣
• 金额: $ 0.96万
• 依托单位: Kumamoto University
• 依托单位国家: 日本
• 项目类别: Grant-in-Aid for Scientific Research on Priority Areas
• 财政年份: 1996
• 资助国家: 日本
• 起止时间: 1996 至 无数据
• 项目状态: 已结题
• 来源: https://kaken.nii.ac.jp/en/grant/KAKENHI-PROJECT-08211256/
• 关键词: Integrabitity; Uniformization; Weyl curvature; Bochner Curvature; Chern-Moser tensor; CR Structure; Kahler Stracture; Developing

幾何構造の積分可能性は構造群が有限型の場合は構造理論があるものの無限型に対しては特にない。この研究では局所共形幾何学において次のプロジェクト:多様体上のIntegrability (積分可能性)とUniformization (一意化).を考え,局所Symplectization に Cauchy-Riemann構造論を展開して,局所Contactizationの不変量を構成し,下記の様な分類成果を得た。一般にn次元リーマン多様体はWeyl 曲率テンサーが消えるとき、共形平坦多様体となりn次元球面S^nに展開される。また,(2n+1)次元CR多様体はChern-Moser曲率テンサーが消えるとき,spherical CR多様体となり,(2n+1)次元球面S^<2n+1>に展開される。そこで2n次元局所共形Kahler 多様体からBochner曲率テンサーがChern-Moser曲率テンサーと一致する局所(2n+1)次元spherical CR多様体を構成した。我々は,群作用を持つCR多様体の分類結果を使って一般化されたBochner曲率テンサーが消えるとき,2n次元局所共形Kahler多様体は次のような幾何学にuniformizeされることを示した。定理(Uniformization):2n次元局所共形Kahler多様体はBochner曲率テンサーが消えるとき,次の幾何学に局所的にモデルされる。(1)複素射影幾何.(2)複素相似幾何.(3)複素双曲幾何.(4)複素射影双曲幾何.特に,コンパクトの場合,次の分類結果を得た。系(Classification):Bochner曲率テンサーが消えるような2n次元コンパクト局所共形Kahler多様体Mは次の局所共形Kahler多様体に共形同値である。さらに,最初からMがKahler多様体のときには,計量の定数倍をのぞいて下のKahler多様体に等長になる。(i)複素射影空間CP^n.(ii)複素ユークリット空間形C^n/Γ.(iii)複素双曲空間形H^n_C/Γ.(iv)ホップ多様体S^<2-1>×S^1/F.(v)複素射影空間×双曲空間形H^mP_C×CP^<n-m>/Γ.

The integral possibility of geometric structure is opposite to that of finite type in case of structural theory, which is opposite to that of infinite type. This study is based on conformal geometry: Integrability and Uniformization on a multiplicity. The Cauchy-Riemann structure theory of local symplectic system is developed. The structure of local symplectic system is not changed. The classification results are obtained. In general, n-dimensional polyhedrons are expanded by Weyl curvature, and conformal flat polyhedrons are expanded by n-dimensional spheres. ,(2n+1) dimensional CR polyhedron Chern-Moser curvature,spherical CR polyhedron,(2n+1) dimensional sphere S^<2n+1>. A 2n dimensional conformal Kahler polyhedron is composed of a 2n+1 dimensional spherical CR polyhedron with a Bochner curvature and a Chern-Moser curvature. We generalize the classification results of CR multibodies by group action, and show that Bochner curvature is uniform in geometry. Theorem (Uniformization): 2n-dimensional conformal Kahler polyhedrons Bochner curvature tensen elimination, sub-geometry tensen elimination (1)Complex prime projective geometry. (2)Complex prime similarity geometry. (3)Complex prime hyperbolic geometry. (4)Complex prime projective hyperbolic geometry. In particular, the classification results are obtained in the case of the classification. Classification:Bochner Curvature In addition, initially, M is Kahler's multiple and the measurement is multiple and equal in length. (i)Complex prime projective spaces CP^n. (ii)Complex prime space C^n/τ. (iii)Complex prime hyperbolic space form H^n_C/τ. (iv)S^<2-1>×S^1/F. (v)Complex prime projective space × hyperbolic space form H^mP_C×CP^<n-m>/τ.

项目成果

Yoshinobu Kamishima: "Transfromation grops on Heisenberg geometry" Kumamoto Journal of Mathematics. 9. 53-64 (1996)

Yoshinobu Kamishima：“海森堡几何学的变换”熊本数学杂志。

Yoshinobu Kamishima: "Standard pseudo-Hermitian structure and Seifert fibration on CR-manifold" Annals of Global Analysis and Geematuy. 12. 261-289 (1994)

Yoshinobu Kamishima：“CR 流形上的标准伪厄米特结构和 Seifert 纤维”《全球分析年鉴》和 Geematuy。

Yoshinobu Kamishima: "Germetric flows on compact manifolds and Gbobal rigidity" Topology. 15. 439-450 (1996)

Yoshinobu Kamishima：“紧凑流形上的几何流动和全球刚性”拓扑。

Yoshinobu Kamishima: "Topology of CR-manifolds and Kahler manifolds" Topology and Gerometry,Proceedings of Workshops in Puremath.15. 42-93 (1996)

Yoshinobu Kamishima：“CR 流形和卡勒流形的拓扑”拓扑和几何学，Puremath 研讨会论文集.15。

Yoshinobu Kamishima: "Locally conformally Kahlerian structres and Unifromization" Geometric,to Pology and Physias, procedings, Gruyter. 1. 1-18 (1997)

Yoshinobu Kamishima：“局部共形卡勒结构和统一化”几何，到 Pology 和 Physias，程序，Gruyter。