学术
Banach空间无界时滞的脉冲发展中立泛函积分微分包含的存在性
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胡军浩[1,2] 沈轶[1]
[1]华中科技大学控制科学与工程系湖北武汉430074 [2]中南民族大学计算机学院,湖北武汉430074
国际标准刊号:ISSN 1001-9847
国内统一刊号:CN 42-1184
摘 要:
本文建立了Banach空间中无界时滞的脉冲发展中立泛函积分微分包含温和解存在的充分条件,我们利用由Dhage建立的多值混合不动点定理与发展系统证明了解的存在性.[著者文摘]
文章出处:
《应用数学》-2007年20卷3期 -568-573页
Mathematica Applicata
分 类 号:
文章编号:
1001-9847(2007)03-0568-06
[参考文献]
Existence Theory of Impulsive Evolution Neutral Functional Integrodifferential Inclusions with Unbounded Delay in Banach Spaces
HU Jun-hao, SHEN Yi. ( l. Department of Control Science and Engineering, Huazhong University of Science and Technology, Wuhan 430074, China ;2. College of Computer Science, South Central University for Nationalities, Wuhan 430074,China)
Abstract:
Sufficient conditions for the existence of mild solutions of some impulsive evolution neutral functional integrodifferential inclusions with unbounded delay in Banach spaces are established. The result is obtained by using recent fixed point theorem for multivalued maps due to Dhage combined with an evolution system.[著者文摘]
Key words:
Impulsive integrodifferential inclusions; Evolution system; Fixed pointtheorem
收稿日期: 2006-12-27
基金资助:
Supported by NNSF of China(60574025)
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