| 不动点集为$RP(2^m)sqcup P(2^m,,2n-1)$的对合 |
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| 引用本文: | 陈德华,王彦英. 不动点集为$RP(2^m)sqcup P(2^m,,2n-1)$的对合[J]. 数学研究及应用, 2009, 29(3): 544-550 |
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| 作者姓名: | 陈德华 王彦英 |
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| 作者单位: | 嘉应学院数学系, 广东 梅州 514015;河北师范大学数学与信息科学学院, 河北 石家庄 050016 |
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| 基金项目: | 国家自然科学基金(No.10371029); 河北省自然科学基金(No.103144). |
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| 摘 要: | Let (M^2m+4n+k-2, T) be a smooth closed manifold with a smooth involution T whose fixed point set is RP(2^m) ∪ P(2^m, 2n - 1) (m 〉 3, n 〉 0). For 2n ≥ 2^m, (M^2m+4n+k-2, T) is bordant to (P(2^m, RP(2n)), To).
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| 关 键 词: | 反相 不动点集 平方 |
| 收稿时间: | 2007-05-06 |
| 修稿时间: | 2008-03-08 |
Involutions Fixing $RP(2^m)sqcup P(2^m,,2n-1)$ |
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| CHEN De Hua and WANG Yan Ying. Involutions Fixing $RP(2^m)sqcup P(2^m,,2n-1)$[J]. Journal of Mathematical Research with Applications, 2009, 29(3): 544-550 |
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| Authors: | CHEN De Hua and WANG Yan Ying |
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| Affiliation: | Department of Mathematics, Jiaying University, Guangdong 514015, China;College of Mathematics and Information Science, Hebei Normal University, Hebei 050016, China |
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| Abstract: | Let $(M^{2^m+4n+k-2},T)$ be a smooth closed manifold with a smooth involution $T$ whose fixed point set is $RP(2^m)sqcup P(2^m,,2n-1)~(m>3,,n>0)$. For $2ngeq2^m$, $(M^{2^m+4n+k-2},,T)$ is bordant to $(P(2^m,,RP(2n)),,T_{0})$. |
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| Keywords: | involution fixed point set characteristic class Bordism class. |
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