Coincidence and Common Fixed Point Results for Generalized $\alpha$-$\psi$ Contractive Type Mappings with Applications

TL;DR

This paper introduces a new class of generalized contractive mappings in metric spaces, proving fixed point theorems that extend existing results and applying them to ordered and cyclic mappings.

Contribution

It presents a novel generalized $oldsymbol{ extalpha}$-$oldsymbol{ extpsi}$ contractive pair of mappings and establishes fixed point theorems that unify and extend prior results in the literature.

Findings

Established fixed point theorems for generalized $ extalpha$-$ extpsi$ mappings.

Extended fixed point results to ordered metric spaces and cyclic mappings.

Provided illustrative examples demonstrating the applicability of the theorems.

Abstract

A new, simple and unified approach in the theory of contractive mappings was recently given by Samet \emph{et al.} (Nonlinear Anal. 75, 2012, 2154-2165) by using the concepts of $\alpha$-$\psi$-contractive type mappings and $\alpha$-admissible mappings in metric spaces. The purpose of this paper is to present a new class of contractive pair of mappings called generalized $\alpha$-$\psi$ contractive pair of mappings and study various fixed point theorems for such mappings in complete metric spaces. For this, we introduce a new notion of $\alpha$-admissible w.r.t $g$ mapping which in turn generalizes the concept of $g$-monotone mapping recently introduced by $\acute{C}$iri$\acute{c}$ et al. (Fixed Point Theory Appl. 2008(2008), Article ID 131294, 11 pages). As an application of our main results, we further establish common fixed point theorems for metric spaces endowed with a partial order as well as in respect of cyclic contractive mappings. The presented theorems extend and subsumes various known comparable results from the current literature. Some illustrative examples are provided to demonstrate the main results and to show the genuineness of our results.