Stability analysis of higher order nonlinear differential equations in beta-normed spaces

Zada Akbar; Shaleena Shaleena; Li Tongxing

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Stability analysis of higher order nonlinear differential equations in beta-normed spaces

机译：β规范空间高阶非线性微分方程的稳定性分析

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摘要

In this paper, we interrogate different Ulam type stabilities, ie, beta-Ulam-Hyers stability, generalized beta-Ulam-Hyers stability, beta-Ulam-Hyers-Rassias stability, and generalized beta-Ulam-Hyers-Rassias stability, for nth order nonlinear differential equations with integrable impulses of fractional type. The existence and uniqueness of solutions are investigated by using the Banach contraction principle. In the end, we give an example to support our main result.

机译：在本文中，我们询问了不同的ulam型稳定性，即Beta-Ulam-Hyers稳定性，广义β-乌拉姆 - Rassias稳定性，Beta-Ulam-Hyers-Rassias稳定性，并且是Nth 顺序非线性微分方程，具有分数型的可加工脉冲。通过使用Banach收缩原理来研究解决方案的存在和唯一性。最终，我们举例说明了支持我们的主要结果。

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来源
《Mathematical Methods in the Applied Sciences》 |2019年第4期|共16页
作者
Zada Akbar; Shaleena Shaleena; Li Tongxing;
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作者单位

Univ Peshawar Dept Math Peshawar 25000 Pakistan;

Univ Peshawar Dept Math Peshawar 25000 Pakistan;

Linyi Univ Shandong Prov Key Lab Network Based Intelligent C LinDa Inst Linyi 276005 Shandong Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
beta-Ulam-Hyers-Rassias stability; integrable impulse of fractional type; Lipschitz condition; Picard operator;

机译：Beta-Ulam-Hyers-Rassias稳定性;分数型的可加换脉冲;嘴唇尖氏型;皮卡德运营商;

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专利

1. Stability analysis of higher order nonlinear differential equations in beta-normed spaces [J] . Zada Akbar, Shaleena Shaleena, Li Tongxing Mathematical Methods in the Applied Sciences . 2019,第4期

机译：β规范空间高阶非线性微分方程的稳定性分析
2. Stability and asymptotic stability of theta-methods for nonlinear stiff Volterra functional differential equations in Banach spaces [J] . Wen LP, Yu YX, Li SF Journal of Computational and Applied Mathematics . 2009,第2期

机译：Banach空间中非线性刚性Volterra泛函微分方程θ方法的稳定性和渐近稳定性
3. Nonlinear stability and asymptotic stability of implicit Euler method for stiff Volterra functional differential equations in Banach spaces [J] . Wen LP, Wang WS, Yu YX, Applied mathematics and computation . 2008,第2期

机译：Banach空间中刚性Volterra泛函微分方程隐式Euler方法的非线性稳定性和渐近稳定性。
4. Stability analysis of nonlinear fractional neutral differential equations with multiple variable time delays [C] . Yanfang Ge, Jun Yang, Junchi Ma International Conference on Automatic Control and Artificial Intelligence . 2013

机译：多个可变时滞的非线性分数中性微分方程的稳定性分析
5. Nonlinear operators and differential equations in abstract spaces [D] . Chen, Yuqing 2000

机译：抽象空间中的非线性算子和微分方程
6. Stability and square integrability of derivatives of solutions of nonlinear fourth order differential equations with delay [O] . Erdal Korkmaz -1

机译：时滞非线性四阶微分方程解的导数的稳定性和平方可积性。
7. Stability of Standing Waves for Nonlinear Schrodinger Equations with Double Power Nonlinearity (Harmonic Analysis and Nonlinear Partial Differential Equations) [O] . 福泉麗佳 2004

机译：具有二次幂非线性的非线性Schrodinger方程（调和分析和非线性偏微分方程）的驻波稳定性。
8. Stability Theory of Nonlinear Operational Differential Equations in Hilbert Spaces [R] . Pao, C. V. 1969

机译：Hilbert空间中非线性微分方程的稳定性理论

Stability analysis of higher order nonlinear differential equations in beta-normed spaces

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