| 向量空间中拟不变元素的结构 |
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| 引用本文: | 冯红.向量空间中拟不变元素的结构[J].数学研究及应用,2000,20(2):197-200. |
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| 作者姓名: | 冯红 |
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| 作者单位: | 大连理工大学应用数学系,116024 |
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| 基金项目: | Supported by the National Natural Science Foundations of China (19771014) and Liaoning Province (972208) |
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| 摘 要: | 设V是有限域上F的向量空间,G是V上的线性变换群.本文讨论了V中拟不变元素的结构·即如果U是V中的拟不变元,则存在g∈G,使得U∩g(U)是G-不变的,或存在x∈ V\U,使得 V+是 G不变的.
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| 关 键 词: | 向量空间 拟不变元素 有限域 结构 线性变换群 |
| 文章编号: | 1000-341(2000)02-0197-04 |
| 收稿时间: | 7/4/1997 12:00:00 AM |
| 修稿时间: | 1997年7月4日 |
Structure of Quasi-Invariant Vector Spaces |
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| FENG Hong.Structure of Quasi-Invariant Vector Spaces[J].Journal of Mathematical Research with Applications,2000,20(2):197-200. |
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| Authors: | FENG Hong |
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| Institution: | Dept. of Appl. Math.; Dalian University of Technology; 116024 |
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| Abstract: | Let V be a vector space over a field F and G a group of linear transformations in V. It is proved in this note that for any subspace U V, if dimU/(U ∩g(U)) ≤1,for any g ∈ G, then there is a g ∈ G such that U ∩ g(U) is a G-invariant subspace,or there is an x ∈ V\U such that U + 〈x〉 is a G-invariant subspace. So a vector-space analog of Brailovsky's results on qnasi-invariant sets is given. |
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| Keywords: | vector space quasi-invariant |
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