Farzad Zarinfar - Academia.edu (original) (raw)
Uploads
Papers by Farzad Zarinfar
Filomat
The aim of the current paper is introducing a generalization of Darbo?s fixed point theorem based... more The aim of the current paper is introducing a generalization of Darbo?s fixed point theorem based on SR-functions. In comparison with simulation function, SR-functions are able to cover the Meir-Keeler functions. Thus, the integral equations which are related to L-functions can be solved by our results. In the sequel, we find a solution for an integral equation to support our results.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with w-distances via Rfunctions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, MeirKeeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.
The aim of the current paper is introducing a generalization of Darbo's fixed point theorem based... more The aim of the current paper is introducing a generalization of Darbo's fixed point theorem based on SR−functions. In comparison with simulation function, SR−functions are able to cover the Meir-Keeler functions. Thus, the integral equations which are related to L−functions can be solved by our results. In the sequel, we find a solution for an integral equation to support our results.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with í µí±¤-distances via í µí± -functions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, Meir-Keeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with í µí±¤-distances via í µí± -functions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, Meir-Keeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.
Filomat
The aim of the current paper is introducing a generalization of Darbo?s fixed point theorem based... more The aim of the current paper is introducing a generalization of Darbo?s fixed point theorem based on SR-functions. In comparison with simulation function, SR-functions are able to cover the Meir-Keeler functions. Thus, the integral equations which are related to L-functions can be solved by our results. In the sequel, we find a solution for an integral equation to support our results.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with w-distances via Rfunctions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, MeirKeeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.
The aim of the current paper is introducing a generalization of Darbo's fixed point theorem based... more The aim of the current paper is introducing a generalization of Darbo's fixed point theorem based on SR−functions. In comparison with simulation function, SR−functions are able to cover the Meir-Keeler functions. Thus, the integral equations which are related to L−functions can be solved by our results. In the sequel, we find a solution for an integral equation to support our results.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with í µí±¤-distances via í µí± -functions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, Meir-Keeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.
We introduce some new generalization of fixed point theorems in complete metric spaces endowed wi... more We introduce some new generalization of fixed point theorems in complete metric spaces endowed with í µí±¤-distances via í µí± -functions. Our results extend many of known fixed point theorems such as Reich type contraction, Geraghty contraction, Meir-Keeler contraction, and Z-contraction. In addition, the result and corollaries show that our approach has a constructive attitude and many known and unknown results can be constructed in such way.