Calogero Vetro scite author profile

Wardowski [Fixed Point Theory Appl., 2012:94] introduced a new concept of contraction and proved a fixed point theorem which generalizes Banach contraction principle. Following this direction of research, we will present some fixed point results for closed multi-valued F-contractions or multi-valued mappings which satisfy an F-contractive condition of Hardy-Rogers-type, in the setting of complete metric spaces or complete ordered metric spaces. An example and two applications, for the solution of certain functional and integral equations, are given to illustrate the usability of the obtained results.

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Nonlinear contractions involving simulation functions in a metric space with a partial order

Argoubi¹,

Samet²,

Vetro³

2015

J. Nonlinear Sci. Appl.

111

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Very recently, Khojasteh, Shukla and Radenović [F. Khojasteh, S. Shukla, S. Radenović, Filomat, 29 (2015), [1189][1190][1191][1192][1193][1194] introduced the notion of Z-contraction, that is, a nonlinear contraction involving a new class of mappings namely simulation functions. This kind of contractions generalizes the Banach contraction and unifies several known types of nonlinear contractions. In this paper, we consider a pair of nonlinear operators satisfying a nonlinear contraction involving a simulation function in a metric space endowed with a partial order. For this pair of operators, we establish coincidence and common fixed point results. As applications, several related results in fixed point theory in a metric space with a partial order are deduced. c 2015 All rights reserved.

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The existence of best proximity points in metric spaces with the property UC

Suzuki

Kikkawa

Vetro

2009

Nonlinear Analysis: Theory, Methods & Applications

176

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Calogero Vetro

Fixed point theorems for -contractive type mappings

Partial Hausdorff metric and Nadlerʼs fixed point theorem on partial metric spaces

Multi-valued F-contractions and the solutions of certain functional and integral equations

Nonlinear contractions involving simulation functions in a metric space with a partial order

The existence of best proximity points in metric spaces with the property UC

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