| Banach空间中泛函微分包含的生存定理 |
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| 引用本文: | 王志华. Banach空间中泛函微分包含的生存定理[J]. 数学研究, 1995, 28(2): 54-59 |
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| 作者姓名: | 王志华 |
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| 作者单位: | 兰州大学数学系 |
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| 摘 要: | 本文研究可分Banach空间中泛函微分包含的解轨道的可生存性,建立了无限维空间中泛函微分包含的生存定理,其推论部分地回答了泛函微分方程中的一个开问题。
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| 关 键 词: | 泛函微分包含,生存定理,相依锥,非紧性测度,Scorza-Dragoni定理 |
Viability Theorems for Differential Inclusions With Memory in Banach Spaces |
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| Wang Zhihua. Viability Theorems for Differential Inclusions With Memory in Banach Spaces[J]. Journal of Mathematical Study, 1995, 28(2): 54-59 |
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| Authors: | Wang Zhihua |
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| Abstract: | This paper is secerned with the Viable solutions of functionsl differeneial Inclusions in Banach Spales, A viability theorem with closed viahility subset was proved and an open Problem in differential equations with memory was answered shen X is a separable Banach space. |
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| Keywords: | Functional differential inclusions Viability theorems Contigent cone Noncompactness measure Scorza-Dragoni type theorems. |
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