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過去の記録 ~04/23|次回の予定|今後の予定 04/24~
| 開催情報 | 金曜日 10:00~11:30 数理科学研究科棟(駒場) 126号室 |
|---|---|
| 担当者 | 植田一石,金井雅彦,二木昭人 |
| 備考 | 開始時間と開催場所などは変更されることがあるので, セミナーごとにご確認ください. |
2014年06月19日(木)
10:00-11:30 数理科学研究科棟(駒場) 122号室
開始時間と開催場所などは変更されることがあるので, セミナーごとにご確認ください.
酒井 高司 氏 (首都大学東京)
Antipodal structure of the intersection of real forms and its applications (JAPANESE)
開始時間と開催場所などは変更されることがあるので, セミナーごとにご確認ください.
酒井 高司 氏 (首都大学東京)
Antipodal structure of the intersection of real forms and its applications (JAPANESE)
[ 講演概要 ]
A subset A of a Riemannian symmetric space is called an antipodal set if the geodesic symmetry s_x fixes all points of A for each x in A. This notion was first introduced by Chen and Nagano. Tanaka and Tasaki proved that the intersection of two real forms L_1 and L_2 in a Hermitian symmetric space of compact type is an antipodal set of L_1 and L_2. As an application, we calculate the Lagrangian Floer homology of a pair of real forms in a monotone Hermitian symmetric space. Then we obtain a generalization of the Arnold-Givental inequality. We expect to generalize the above results to the case of complex flag manifolds. In fact, using the k-symmetric structure, we can describe an antipodal set of a complex flag manifold. Moreover we can observe the antipodal structure of the intersection of certain real forms in a complex flag manifold.
This talk is based on a joint work with Hiroshi Iriyeh and Hiroyuki Tasaki.
A subset A of a Riemannian symmetric space is called an antipodal set if the geodesic symmetry s_x fixes all points of A for each x in A. This notion was first introduced by Chen and Nagano. Tanaka and Tasaki proved that the intersection of two real forms L_1 and L_2 in a Hermitian symmetric space of compact type is an antipodal set of L_1 and L_2. As an application, we calculate the Lagrangian Floer homology of a pair of real forms in a monotone Hermitian symmetric space. Then we obtain a generalization of the Arnold-Givental inequality. We expect to generalize the above results to the case of complex flag manifolds. In fact, using the k-symmetric structure, we can describe an antipodal set of a complex flag manifold. Moreover we can observe the antipodal structure of the intersection of certain real forms in a complex flag manifold.
This talk is based on a joint work with Hiroshi Iriyeh and Hiroyuki Tasaki.
