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Abstract and Applied Analysis

İlhan

2013

We present a theorem which gives sufficient conditions for existence of at least one solution for some nonlinear functional integral equations in the space of continuous functions on the interval [0, ]. To do this, we will use Darbo's fixed-point theorem associated with the measure of noncompactness. We give also an example satisfying the conditions of our main theorem but not satisfying the conditions described by Maleknejad et al. (2009).

An Application of Darbo Fixed-Point Theorem to a Class of Functional Integral Equations

Numerical Functional Analysis and Optimization

2014

An Application of Krasnoselskii Fixed Point Theorem to Some Nonlinear Functional Integral Equations

Nevşehir bilim teknol. derg.

Özdemır²

2015

Salgın Hastalıkların Yayılmasında Yüksek Riskli Bireylerin Dikkate Alındığı Bir Matematiksel Modelin Analizi

2021

Applications of Measure of Noncompactness and Darbo’s Fixed Point Theorem to Nonlinear Integral Equations in Banach Spaces

Numerical Functional Analysis and Optimization

2017

On the Solutions of a Class of Nonlinear Integral Equations in the Banach Algebra of the Continuous Functions and Some Examples

Özdemır¹,

İlhan²,

Çakan³

2014

In this paper, we study the existence of the solutions of a class of functional integral equations which contain a lot of classical nonlinear integral equations as special cases. We consider the solvability of the equations in the Banach algebra of continuous functions on a closed and bounded interval. The main tools here are the measure of noncompactness and the suitable fixed point theorem for the product of two operators in the Banach algebra.

Krasnoselskii Sabit Nokta Teoreminin Lineer Olmayan Bazı Fonksiyonel İntegral Denklemlere Uygulaması

Çakan¹,

Özdemır²

2015

On the solutions of a class of nonlinear functional integral equations in space C [0,a]

2015

JMA

On the solutions of a class of nonlinear functional integral equations in space C [0, a] IsmetÖzdemir andÜmit Ç akanAbstract: The principal aim of this paper is to give sufficient conditions for solvability of a class of some nonlinear functional integral equations in the space of continuous functions defined on interval [0, a]. The main tool used in our study is associated with the technique of measures of noncompactness. We give also some examples satisfying the conditions of our main theorem but not satisfying the conditions in [8].