A simulation function approach for optimization by approximate solutions with an application to fractional differential equation
From MaRDI portal
Publication:6497514
Parvaneh Lo'lo', Maryam Shams, Stojan Radenović
Publication date: 6 May 2024
Published in: Nonlinear Analysis. Modelling and Control (Search for Journal in Brave)
fractional differential equationcommon best proximity pointsimulation functionsP-propertycommute proximally\((\mathcal{Z}_d, T)\)-contraction
Cites Work
- Unnamed Item
- Existence of a common solution of an integral equations system by \((\psi, \alpha, \beta)\)-weakly contractions
- Best approximation and variational inequality problems involving a simulation function
- Common best proximity points results for new proximal \(C\)-contraction mappings
- Coincidence point theorems on metric spaces via simulation functions
- Best proximity points of cyclic mappings
- Convergence and existence results for best proximity points
- An approach to best proximity points results via simulation functions
- A note on best proximity point theorems under weak \(P\)-property
- Fixed point theorems on ordered metric spaces and applications to nonlinear elastic beam equations
- A note on some best proximity point theorems proved under \(P\)-property
- Uniqueness of solution for higher-order nonlinear fractional differential equations with multi-point and integral boundary conditions
- Best proximity points involving simulation functions with \(w_0\)-distance
- Best proximity points for some classes of proximal contractions
- On \(\Omega\) class of mappings in a \(p\)-cyclic complete metric space
- Common best proximity points theorem for four mappings in metric-type spaces
- Best proximity points for cyclic Meir-Keeler contractions
- Convergence and existence results for best C-proximity points
- Nonlinear contractions involving simulation functions in a metric space with a partial order
- Proximinal Retracts and Best Proximity Pair Theorems
- Interpolative Rus-Reich-Ćirić Type Contractions via Simulation Functions
- Existence of fixed point and best proximity point of p-cyclic orbital phi-contraction map
- A new approach to the study of fixed point theory for simulation functions
- Fixed points results via simulation functions
- BEST PROXIMITY POINTS AND FIXED POINTS WITH -FUNCTIONS IN THE FRAMEWORK OF -DISTANCES
- A bilateral contraction via simulation function
- Existence of a solution for a nonlinear integral equation by nonlinear contractions involving simulation function in partially ordered metric space
This page was built for publication: A simulation function approach for optimization by approximate solutions with an application to fractional differential equation
