| 杨和.脉冲发展方程初值问题的正解[J].数学研究及应用,2011,31(6):1047~1056 |
| 脉冲发展方程初值问题的正解 |
| Positive Solutions for the Initial Value Problems of Impulsive Evolution Equations |
| 投稿时间:2010-01-03 修订日期:2011-01-12 |
| DOI:10.3770/j.issn:1000-341X.2011.06.012 |
| 中文关键词: 脉冲发展方程 $e$-正mild解 等度连续半群 非紧性测度. |
| 英文关键词:impulsive evolution equation $e$-positive mild solution equicontinuous semigroup Measure of noncompactness. |
| 基金项目:国家自然科学基金(Grant No.10871160),甘肃省自然科学基金(Grant No.0710RJZA103). |
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| 中文摘要: |
| 在有序~Banach~空间~$E$~中, 考虑非紧半群的脉冲发展方程初值问题$$\left\{\begin{array}{ll} u'(t) Au(t)=f(t, u(t)), t\in [0, \infty), t\neq t_{k} ,\\[6pt] \triangle u|_{t=t_{k}}=I_{k}(u(t_{k})), k=1, 2, \cdots, \\[6pt] u(0)=x_{0}\end{array}\right.$$$e$-正~mild~解的存在性. 在对脉冲函数不作 |
| 英文摘要: |
| This paper deals with the existence of $e$-positive mild solutions (see Definition 1) for the initial value problem of impulsive evolution equation with noncompact semigroup $$\left\{\begin{array}{ll} u'(t) Au(t)=f(t,\ u(t)),\ t\in [0,\ \infty),\ t\neq t_{k},\\[6pt] \triangle u|_{t=t_{k}}=I_{k}(u(t_{k})),\ k=1,2,\ldots,\\[6pt] u(0)=x_{0}\end{array}\right.$$ in an ordered Banach space $E$. By using operator semigroup theory and monotonic iterative technique, without any hypothesis on the impulsive functions, an existence result of $e$-positive mild solutions is obtained under weaker measure of noncompactness condition on nonlinearity of $f$. Particularly, an existence result without using measure of noncompaceness condition is presented in ordered and weakly sequentially complete Banach spaces, which is very convenient for application. An example is given to illustrate that our results are more valuable. |
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