Approximating Solutions of Non Linear First Order Abstract Measure Differential Equations by Using Dhage Iteration Method

IF 4.6 2区数学 Q1 MATHEMATICS, APPLIED

Applied and Computational Mathematics Pub Date : 2020-06-05 DOI:10.11648/J.ACM.20200903.13

Dnyanoba Maroti Suryawanshi, S. S. Bellale, Pratiksha Prakash Lenekar

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引用次数: 0

Abstract

In this paper we have proved the approximating solutions of the nonlinear first order abstract measure differential equation by using Dhage’s iteration method. The main result is based on the iteration method included in the hybrid fixed point theorem in a partially ordered normed linear space. Also we have solved an example for the applicability of given results in the paper. Sharma [2] initiated the study of nonlinear abstract differential equations and some basic results concerning the existence of solutions for such equations. Later, such equations were studied by various authors for different aspects of the solutions under continuous and discontinuous nonlinearities. The study of fixed point theorem for contraction mappings in partial ordered metric space is initiated by different authors. The study of hybrid fixed point theorem in partially ordered metric space is initiated by Dhage with applications to nonlinear differential and integral equations. The iteration method is also embodied in hybrid fixed point theorem in partially ordered spaces by Dhage [12]. The Dhage iteration method is a powerful tool for proving the existence and approximating results for nonlinear measure differential equations. The approximation of the solutions are obtained under weaker mixed partial continuity and partial Lipschitz conditions. In this paper we adopted this iteration method technique for abstract measure differential equations.

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非线性一阶抽象测度微分方程的Dhage迭代近似解

本文用哈格迭代法证明了非线性一阶抽象测度微分方程的近似解。主要结果是基于部分有序赋范线性空间中混合不动点定理所包含的迭代方法。并通过算例验证了本文所得结果的适用性。Sharma[2]开创了非线性抽象微分方程的研究，并提出了该类方程解存在性的一些基本结果。后来，不同的作者对这类方程在连续和不连续非线性下解的不同方面进行了研究。偏序度量空间中收缩映射不动点定理的研究是由不同的作者提出的。半有序度量空间中混合不动点定理的研究由hage提出，并应用于非线性微分方程和积分方程。在部分有序空间的混合不动点定理中也体现了迭代方法。Dhage迭代法是证明非线性测度微分方程存在性和逼近结果的有力工具。在较弱的混合部分连续和部分Lipschitz条件下，得到了解的近似解。本文对抽象测度微分方程采用了这种迭代方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Applied and Computational Mathematics 数学-应用数学

CiteScore

8.80

自引率

5.00%

发文量

审稿时长

6 months

期刊介绍： Applied and Computational Mathematics (ISSN Online: 2328-5613, ISSN Print: 2328-5605) is a prestigious journal that focuses on the field of applied and computational mathematics. It is driven by the computational revolution and places a strong emphasis on innovative applied mathematics with potential for real-world applicability and practicality. The journal caters to a broad audience of applied mathematicians and scientists who are interested in the advancement of mathematical principles and practical aspects of computational mathematics. Researchers from various disciplines can benefit from the diverse range of topics covered in ACM. To ensure the publication of high-quality content, all research articles undergo a rigorous peer review process. This process includes an initial screening by the editors and anonymous evaluation by expert reviewers. This guarantees that only the most valuable and accurate research is published in ACM.