A mixed-type Picard-\(\mathrm{S}\) iterative method for estimating common fixed points in hyperbolic spaces
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Publication:6616482
DOI10.11948/20230125MaRDI QIDQ6616482
Godwin Chidi Ugwunnadi, Chun-Gil Park, Hassen Aydi, Ojen K. Narain, Austine Efut Ofem, Jacob Ashiwere Abuchu
Publication date: 9 October 2024
Published in: Journal of Applied Analysis and Computation (Search for Journal in Brave)
Monotone operators and generalizations (47H05) Stability, separation, extension, and related topics for functional equations (39B82) Contraction-type mappings, nonexpansive mappings, (A)-proper mappings, etc. (47H09)
Cites Work
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- \(\Delta\)-convergence theorems for multi-valued nonexpansive mappings in hyperbolic spaces
- An implicit algorithm for two finite families of nonexpansive maps in hyperbolic spaces
- Fixed point theorems and stability results for fixed point iteration procedures
- A quadratic rate of asymptotic regularity for CAT(0)-spaces
- A concept of convergence in geodesic spaces
- Data dependence for Ishikawa iteration when dealing with contractive-like operators
- Fixed points of quasinonexpansive mappings
- Stability of the Mann and Ishikawa iteration procedures for \(\phi\)-strong pseudocontractions and nonlinear equations of the \(\phi\)-strongly accretive type
- Stability of the Ishikawa iteration method for quasi-contractive maps
- A note on the stability of iteration procedures for strong pseudocontractions and strongly accretive type equations
- New approximation schemes for general variational inequalities
- A stable iteration procedure for quasi-contractive maps
- Stability results for the Ishikawa fixed point iteration procedure
- Convergence and stability of an iteration process and solution of a fractional differential equation
- A new iterative approximation scheme for Reich-Suzuki-type nonexpansive operators with an application
- Integral representation of functions of bounded variation
- Approximating fixed points of Reich-Suzuki type nonexpansive mappings in hyperbolic spaces
- Picard iteration converges faster than Mann iteration for a class of quasi-contractive operators
- Fixed point approximation of Picard normal \(S\)-iteration process for generalized nonexpansive mappings in hyperbolic spaces
- A Picard-Mann hybrid iterative process
- Fixed point theorems and convergence theorems for some generalized nonexpansive mappings
- Convergence of an implicit iteration process for a finite family of asymptotically quasi-nonexpansive mappings in convex metric spaces
- Iteration processes for nonexpansive mappings
- COMMON FIXED POINTS OF TWO NONEXPANSIVE MAPPINGS BY A MODIFIED FASTER ITERATION SCHEME
- Nonexpansive iterations in hyperbolic spaces
- Approximating Fixed Points of Nonexpansive Mappings
- Fixed Points and Iteration of a Nonexpansive Mapping in a Banach Space
- Some logical metatheorems with applications in functional analysis
- A ROBUST ITERATIVE APPROACH FOR SOLVING NONLINEAR VOLTERRA DELAY INTEGRO–DIFFERENTIAL EQUATIONS
- A Picard-S iterative method for approximating fixed point of weak-contraction mappings
- The Round‐off Stability of Iterations
- Mean Value Methods in Iteration
- A NEW ITERATIVE METHOD FOR SOLVING SPLIT FEASIBILITY PROBLEM
- Noncyclic $\varphi$-contractions in hyperbolic uniformly convex metric spaces
- On a four-step iterative algorithm and its application to delay integral equations in hyperbolic spaces
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