| Banach 空间中极大单调算子扰动的值域 |
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| 引用本文: | 任卫云,何震. Banach 空间中极大单调算子扰动的值域[J]. 系统科学与数学, 2005, 25(5): 533-542 |
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| 作者姓名: | 任卫云 何震 |
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| 作者单位: | 1. 南开大学数学科学学院,天津,300071
2. 河北大学数学与计算机学院,河北,071002 |
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| 基金项目: | 国家自然科学基金(10271060)高校博士点基金(20010055013)资助课题. |
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| 摘 要: | 设X为实Banach空间, T:D(T)(?)X→2X*为极大单调算子, C: D(T)(?)X→X*为有界算子(未必连续),而C(T+J)-1为紧算子.本文在上述假设条件下,通过附加一定的边界条件应用Leray-Schauder度理论研究了下述包含关系:0∈(T+C)(D(T)∩ BQ(0)),0∈(T+C)(D(T)∩ BQ(0));以及S(?)R(T+C), intS(?)intR(T+C)(其中S(?) X*);B+D(?)R(T+C),int(B+D)(?)intR(T+C)(其中 B(?)X*,D(?)X*)的可解性,得出了一些新的结论.
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| 关 键 词: | 极大单调算子 强单调算子 全连续算子 Leray-Schauder度理论. |
| 修稿时间: | 2003-01-10 |
RANGES OF PERTURBED MAXIMAL MONOTONE OPERATORS IN BANACH SPACES |
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| Ren Weiyun,He Zhen. RANGES OF PERTURBED MAXIMAL MONOTONE OPERATORS IN BANACH SPACES[J]. Journal of Systems Science and Mathematical Sciences, 2005, 25(5): 533-542 |
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| Authors: | Ren Weiyun He Zhen |
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| Affiliation: | (1)College of Mathematics Science , Nankai University , Tianjian 300071;(2)College of Mathematics and Computer, Hebei University, Hebei Baoding 071002 |
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| Abstract: | Let $X$ be a real Banach space,$T:D(T)subset Xrightarrow 2^{X^{*}}$ be a maximal monotoneoperator , $C:D(T)subset Xrightarrow X^{*}$ be bounded (but neednot to be continuous) and $C(T+J)^{-1}$ be a compact operator. Under the above conditions, by adding certain boundaryand making use of Leray-Schauder degree theory, in this paper we studythe solvability of the following inclusions:$0inoverline{(T+C)(D(T)cap B_Q(0))},hspace{1mm}0in(T+C)(D(T)cap B_Q(0))$; and $Ssubsetoverline{R(T+C)}$,int$S$$subset$int$ R(T+C)$ (where $Ssubset X^{*}$); and$B+Dsubsetoverline{R(T+C)}$, int$(B+D)$$subset$int$ {R(T+C)}$ (where $Bsubset X^{*}$ and $Dsubset X^{*}$). Based on this, we derive some new conclusions. |
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| Keywords: | Maximal monotone operator strongly monotone operator completely continuous operator Leray-Schauder degree theory |
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