包含偏离参数的索波列夫型分数脉冲微分方程温和解的存在性

Q3 Mathematics

Results in Control and Optimization Pub Date : 2024-07-01 DOI:10.1016/j.rico.2024.100451

Kottakkaran Sooppy Nisar , Kalimuthu Kaliraj , Mohan Manjula , Chokkalingam Ravichandran , Suliman Alsaeed , Shankar Rao Munjam

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引用次数: 0

摘要

研究的主题是索波列夫类型的脉冲分微分方程，包括偏差论证。解析半群法和定点法用于确定近似的存在性。封闭线性算子的分数幂概念用于说明近似如何收敛。为了得出独特的方法，我们使用了近似策略。我们的主要结论将通过一个例子来定义。

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Existence of a mild solution for a fractional impulsive differential equation of the Sobolev type including deviating argument

The impulsive fractional differential equation of the Sobolev type, including deviating arguments, is the subject of the study. The analytic semigroup and fixed point approaches serve the purpose of determining the existence of the approximations. The fractional power of a closed linear operator concept is used to show how the approximation converges. To arrive at a unique approach, an approximation strategy is used. Our main conclusions are defined using an example.

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来源期刊

Results in Control and Optimization Mathematics-Control and Optimization

CiteScore

3.00

自引率

0.00%

发文量

审稿时长

91 days