用不动点定理研究函数方程的渐近稳定性

Muhammad N. Islam, Jeffrey T. Neugebauer
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引用次数: 0

摘要

多年来,李亚普诺夫直接方法一直是研究泛函微分方程各种稳定性的主要技术,也称为“李亚普夫稳定性”。最近,人们注意到当Liapunov方法应用于某些方程时会出现一些困难,并且一个合适的不动点定理可以克服其中的一些困难。本文研究了一个不同于李雅普诺夫稳定性的特殊稳定性。特别地,我们研究了一类非线性Volterra积分方程组渐近稳定解的存在性。我们在分析中使用了克拉斯诺塞尔的不动点定理。AMS受试者分类:47H10接收时间:2017年6月13日;受理时间:2018年10月31日;发布时间:2018年11月13日。doi:10.12732/caa.v22i4.8动态出版商,股份有限公司,Acad。有限公司出版社。http://www.acadsol.eu/caa612 M.N.ISLAM和J.T.NEUGEBAUER
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ASYMPTOTIC STABILITY OF FUNCTIONAL EQUATIONS BY FIXED POINT THEOREMS
For many years, Liapunov’s direct method has been the primary technique for studying various stability also known as ‘Liapunov stability’ of functional differential equations. Recently, it has been noticed that some difficulties can arise when Liapunov’s method is applied to certain equations, and that a suitable fixed point theorem can overcome some of these difficulties. In this paper we study a particular stability which differs from the Liapunov stability. In particular, we study the existence of asymptotically stable solutions of a system of nonlinear Volterra integral equations. We employ a fixed point theorem due to Krasnosel’skii in the analysis. AMS Subject Classification: 47H10 Received: June 13, 2017 ; Accepted: October 31, 2018 ; Published: November 13, 2018. doi: 10.12732/caa.v22i4.8 Dynamic Publishers, Inc., Acad. Publishers, Ltd. http://www.acadsol.eu/caa 612 M.N. ISLAM AND J.T. NEUGEBAUER
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