On some generalizations of Darbo- and Sadovskii- type fixed point theorems in Fréchet spaces

Integral equations form an essential part of nonlinear analysis. In many situations, when seeking solutions to such equations, we utilize fixed-point theorems. Among the most well-known and useful in this regard are the theorems of Darbo and Sadovskii, which generalize the classical results of Schau...

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Bibliographic Details
Published in:Numerical functional analysis and optimization 2024-07, Vol.45 (7-9), p.441-455
Main Authors: Olszowy, Leszek, Zając, Tomasz
Format: Article
Language:English
Subjects:
Convex-power mappings
Darbo- and Sadovskii- type fixed point theorem
Fixed points (mathematics)
Integral equations
Measure of noncompactness
Nonlinear analysis
Theorems
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Summary:Integral equations form an essential part of nonlinear analysis. In many situations, when seeking solutions to such equations, we utilize fixed-point theorems. Among the most well-known and useful in this regard are the theorems of Darbo and Sadovskii, which generalize the classical results of Schauder and Tikhonov. These theorems have seen many generalizations. The aim of the paper is to strengthen (by weakening the assumptions) several known Darbo- and Sadovskii-type fixed-point theorems in the so-called power version for Fréchet spaces, which are particularly useful for studying the solvability of equations defined on an unbounded interval. A theorem on the existence of solutions to a nonlinear integral equation, illustrating the application of our main result, is also provided.
ISSN:0163-0563
1532-2467
DOI:10.1080/01630563.2024.2384860