Classification of totally real and totally geodesic submanifolds of compact 3-symmetric spaces
スポンサーリンク
概要
- 論文の詳細を見る
It is known that each 3-symmetric space admits an invariant almost complex structure J, so-called a canonical almost complex structure. By making use of simple graded Lie algebras and an affine Lie algebra, we classify half dimensional, totally real (with respect to J) and totally geodesic submanifolds of compact 3-symmetric spaces.
- 社団法人 日本数学会の論文
- 2006-01-01
著者
-
Tojo Koji
Department Of Biology Faculty Of Science Shinshu University
-
Tojo Koji
Department Of Mathematics Chiba Institute Of Technology
関連論文
- Totally real totally geodesic submanifolds of compact 3-symmetricspaces
- Classification of totally real and totally geodesic submanifolds of compact 3-symmetric spaces
- OVARIAN STRUCTURE AND OOGENESIS OF A SOUTH AFRICAN HEEL-WALKER, KAROOPHASMA BIEDOUWENSIS (MANTOPHASMATODEA)(Taxonomy and Systematics,Abstracts of papers presented at the 75^ Annual Meeting of the Zoological Society of Japan)
- Biology of the mayfly Bleptus fasciatus Eaton (Insecta : Ephemeroptera, Heptageniidae), with special reference to the distribution, habitat environment, life cycle, and nuptial behavior
- Complex structures, totally real and totally geodesic submanifolds of compact 3-symmetric spaces, and affine symmetric spaces
- Reproductive mode of the geographic parthenogenetic mayfly Ephoron shigae, with findings from some new localities (Insecta : Ephemeroptera, Polymitarcyidae)
- Rapid expansion of the distributional range and the population genetic structure of the freshwater amphipod Crangonyx floridanus in Japan
- Habitat segregation and genetic relationship of two heptageniid mayflies, Epeorus latifolium and Epeorus 1-nigrus, in the Shinano-gawa River basin