Convergence theorems for generalized contractions and applications
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Publication:5865744
DOI10.2298/FIL2003945YzbMath1491.54172OpenAlexW3112292510MaRDI QIDQ5865744
Mudasir Younis, Stojan Radenović, Deepak Singh, Mohammad Imdad
Publication date: 9 June 2022
Published in: Filomat (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2298/fil2003945y
integral equationfixed point\(F\)-contractionpartial \(b\)-metric spacegraphic contractionSuzuki-Geraghty type generalised \((F, \psi)\)-contraction
Fixed-point and coincidence theorems (topological aspects) (54H25) Special maps on metric spaces (54E40)
Related Items (13)
On the existence of the solution of Hammerstein integral equations and fractional differential equations ⋮ Fixed point results of Jaggi-type hybrid contraction in generalized metric space ⋮ Decision-making on the solution of a stochastic nonlinear dynamical system of Kannan-type in new sequence space of soft functions ⋮ Prequasiideal of the type weighted binomial matrices in the Nakano sequence space of soft functions with some applications ⋮ Fixed point results of Jaggi-Suzuki-type hybrid contractions with applications ⋮ Some critical remarks on recent results concerning $\digamma-$contractions in $b$-metric spaces ⋮ A fixed point technique for solving an integro-differential equation using mixed-monotone mappings ⋮ Fixed point results for rational orbitally \((\Theta,\delta_b)\)-contractions with an application ⋮ On some common fixed point results for weakly contraction mappings with application ⋮ Unnamed Item ⋮ On some fixed point theorems for multivalued \(F\)-contractions in partial metric spaces ⋮ A forward-backward-forward algorithm for solving quasimonotone variational inequalities ⋮ Some critical remarks on “Some new fixed point results in rectangular metric spaces with an application to fractional-order functional differential equations”
Cites Work
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- Fixed points of conditionally \(F\)-contractions in complete metric-like spaces
- A note on partial \(b\)-metric spaces
- Generalized Geraghty type mappings on partial metric spaces and fixed point results
- Fixed points of a new type of contractive mappings in complete metric spaces
- Iterated function systems consisting of \(F\)-contractions
- Fixed point theorems for \(\alpha\)-Geraghty contraction type maps in metric spaces
- Fixed points of Geraghty-type mappings in various generalized metric spaces
- A fixed point theorem for generalized \(F\)-contractions on complete metric spaces
- Be careful on partial metric fixed point results
- Some fixed point theorems for (\(\alpha\), \(\beta\))-admissible Geraghty type contractive mappings and related results
- Fixed point theorems for generalized \(F\)-Suzuki-contraction mappings in complete \(b\)-metric spaces
- Some common fixed point results in ordered partial b-metric spaces
- Applications of graph Kannan mappings to the damped spring-mass system and deformation of an elastic beam
- Some fixed point theorems concerning \(F\)-contraction in complete metric spaces
- Fixed points of \(F\)-weak contractions on complete metric spaces
- Partial b-metric spaces and fixed point theorems
- A novel approach of graphical rectangular $b$-metric spaces with an application to the vibrations of a vertical heavy hanging cable
- Fixed points for Geraghty-Contractions in partial metric spaces
- Solving Existence Problems via F-Reich Contraction
- Partial Metric Topology
- Common fixed point of a power graphic (F; fi)-contraction pair on partial b-metric spaces with application
- Notes on Some Recent Papers Concerning $F$-Contractions in $b$-Metric Spaces
- The contraction principle for mappings on a metric space with a graph
- A generalized Banach contraction principle that characterizes metric completeness
- On Contractive Mappings
- Results on contractions of Reich type in graphical b-metric spaces with applications
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