Measure of noncompactness and a generalized Darbo's fixed point theorem and its applications to a system of integral equations
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Publication:2078438
DOI10.1186/s13662-020-02703-zzbMath1489.47074OpenAlexW3032331240MaRDI QIDQ2078438
Maryam Khorshidi, Vahid Parvaneh, Manuel de la Sen, Huseyin Isik, Mohammad Mursaleen
Publication date: 28 February 2022
Published in: Advances in Difference Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1186/s13662-020-02703-z
Fixed-point theorems (47H10) Applications of operator theory to differential and integral equations (47N20) Systems of nonlinear integral equations (45G15) Measures of noncompactness and condensing mappings, (K)-set contractions, etc. (47H08)
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Cites Work
- Unnamed Item
- Fixed point theorems in partially ordered metric spaces and applications
- A generalization of Darbo's theorem with application to the solvability of systems of integral equations
- Punti uniti in trasformazioni a codominio non compatto
- Advances in Nonlinear Analysis via the Concept of Measure of Noncompactness
- An extension of Darbo's theorem and its application to system of neutral differential equations with deviating argument
- Solvability of a system of integral equations of Volterra type in the Fréchet space lp loc(R+) via measure of noncompactness
- An extension of Darbo’s theorem and its application to existence of solution for a system of integral equations
- A Generalization of the Meir-Keeler Condensing Operators and its Application to Solvability of a System of Nonlinear Functional Integral Equations of Volterra Type
- Sequence Spaces and Measures of Noncompactness with Applications to Differential and Integral Equations
