具分段常数变元的脉冲微分不等式与脉冲积分不等式; Impulsive Differential Inequalities and Impulsive Integral Inequalities with Piecewise Constant Arguments | |
李晓迪 | |
2009 | |
关键词 | 混合变元 脉冲微分不等式 脉冲积分不等式 振动性 mixed type impulsive differential inequalities impulsive integral inequalities oscillation |
英文摘要 | 本文研究了一类具分段常数变元的脉冲微分不等式。利用归纳和迭代法,得到了这类不等式解的有效估计。通过选择适当的变换,文中得到了若干具分段常数变元的脉冲积分不等式解的有效估计。最后,给出了该类不等式在脉冲微分系统振动性方面的应用。; In this paper, a class of impulsive differential inequalities is discussed.An effcient estimation for solutions of this kind of inequalities is derived by using induction and iteration.Moreover, some effcient estimations for solutions of impulsive integral inequalities are also obtained by proper transformations.Finally, an application for oscillation of impulsive differential systems is given to illustrate the inequalities. |
语种 | zh_CN |
内容类型 | 期刊论文 |
源URL | [http://dspace.xmu.edu.cn/handle/2288/119705] |
专题 | 数学科学-已发表论文 |
推荐引用方式 GB/T 7714 | 李晓迪. 具分段常数变元的脉冲微分不等式与脉冲积分不等式, Impulsive Differential Inequalities and Impulsive Integral Inequalities with Piecewise Constant Arguments[J],2009. |
APA | 李晓迪.(2009).具分段常数变元的脉冲微分不等式与脉冲积分不等式.. |
MLA | 李晓迪."具分段常数变元的脉冲微分不等式与脉冲积分不等式".(2009). |
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