Alternated inertial relaxed Tseng method for solving fixed point and quasi-monotone variational inequality problems
Austine Efut Ofem, C. Agbonkhese, Akindele A. Mebawondu, G. C. Ugwunnadi, Ojen K. Narain
Publication date: 19 June 2024
Published in: Nonlinear Functional Analysis and Applications (Search for Journal in Brave)
fixed pointvariational inequality problemquasimonotone operatorstrong convergence and linear convergenceTseng method
Fixed-point theorems (47H10) Contraction-type mappings, nonexpansive mappings, (A)-proper mappings, etc. (47H09) Fixed points and periodic points of dynamical systems; fixed-point index theory; local dynamics (37C25)
Cites Work
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- A relaxed projection method for split variational inequalities
- The subgradient extragradient method for solving variational inequalities in Hilbert space
- Strong convergence theorem by a hybrid extragradient-like approximation method for variational inequalities and fixed point problems
- Inertial subgradient extragradient algorithms with line-search process for solving variational inequality problems and fixed point problems
- A self-adaptive projection method with an inertial technique for split feasibility problems in Banach spaces with applications to image restoration problems
- Self-adaptive subgradient extragradient method with inertial modification for solving monotone variational inequality problems and quasi-nonexpansive fixed point problems
- A new iterative approximation scheme for Reich-Suzuki-type nonexpansive operators with an application
- An alternated inertial method for pseudomonotone variational inequalities in Hilbert spaces
- Iterative method with inertial terms for nonexpansive mappings: applications to compressed sensing
- Projection methods with alternating inertial steps for variational inequalities: weak and linear convergence
- On bilevel split pseudomonotone variational inequality problems with applications
- Weak convergence theorem by an extragradient method for nonexpansive mappings and monotone mappings
- Quasimonotone variational inequalities in Banach spaces
- A new double projection algorithm for variational inequalities
- Iterative Algorithms for Nonlinear Operators
- The shrinking projection method for a finite family of demimetric mappings with variational inequality problems in a Hilbert space
- A Modified Forward-Backward Splitting Method for Maximal Monotone Mappings
- Some methods of speeding up the convergence of iteration methods
- An inertial extrapolation method for convex simple bilevel optimization
- Weak and strong convergence theorems for fixed points of asymptotically nonexpansive mappings
- An inertial proximal method for maximal monotone operators via discretization of a nonlinear oscillator with damping
- Improvements of some projection methods for monotone nonlinear variational inequalities
- A modified subgradient extragradient algorithm-type for solving quasimonotone variational inequality problems with applications
- Inertial extrapolation method with regularization for solving a new class of bilevel problem in real Hilbert spaces
- A self adaptive method for solving a class of bilevel variational inequalities with split variational inequality and composed fixed point problem constraints in Hilbert spaces
- Relaxed Tseng splitting method with double inertial steps for solving monotone inclusions and fixed point problems
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