Fixed point results for Geraghty quasi-contraction type mappings in dislocated quasi-metric spaces

Abstract: In this paper, fixed point results for a newly introduced Geraghty quasi-contraction type mappings are proved in more general metric spaces called T-orbitally complete dislocated quasi-metric spaces. Geraghty quasi-contraction type mappings generalize, among others, Ciric’s quasi-contraction mappings and other Geraghty quasi-contractive type mappings in the literature. Fixed point results are obtained without imposing a continuity condition on the mapping, thereby further generalizing some other related work i… Show more

“…Numerous results on best proximity point theory were studied by several authors ( [1], [3], [4], [5]) imposing sufficient conditions that would assure the existence and uniqueness of such points. These results are generalizations of the contraction principle and other contractive mappings ( [2], [6], [8], [16], [21], [22], [24]) in the case of self-mappings, which reduces to a fixed point if the mapping under consideration is a self-mapping. The notion of best proximity point was introduced in [14], the class of proximal quasi contraction mappings was introduced in [11] and thereafter, several known results were derived ( [10], [12], [13]).…”

“…Best proximity pair theorems analyse the conditions under which the optimization problem, namely min x∈A d(x, T x) has a solution and is known to have applications in game theory. For additional information on best proximity point, see [7], [9], [10], [11], [12], [13], [14], [15], [17], [18], [20], [23]. Definition 1.1 [4].…”

“…Recently, using these class of functions, Umudu et al [22] introduced a new class of quasicontraction type mappings called generalized α-φ-Geraghty quasi-contraction type mappings and proved the existence of its unique fixed point as follows. Definition 1.3 [22]. Let (X, d) be a metric space and α :…”

Best Proximity Points for Generalized Geraghty Quasi-Contraction Type Mappings in Metric Spaces

“…Numerous results on best proximity point theory were studied by several authors ( [1], [3], [4], [5]) imposing sufficient conditions that would assure the existence and uniqueness of such points. These results are generalizations of the contraction principle and other contractive mappings ( [2], [6], [8], [16], [21], [22], [24]) in the case of self-mappings, which reduces to a fixed point if the mapping under consideration is a self-mapping. The notion of best proximity point was introduced in [14], the class of proximal quasi contraction mappings was introduced in [11] and thereafter, several known results were derived ( [10], [12], [13]).…”

“…Best proximity pair theorems analyse the conditions under which the optimization problem, namely min x∈A d(x, T x) has a solution and is known to have applications in game theory. For additional information on best proximity point, see [7], [9], [10], [11], [12], [13], [14], [15], [17], [18], [20], [23]. Definition 1.1 [4].…”

“…Recently, using these class of functions, Umudu et al [22] introduced a new class of quasicontraction type mappings called generalized α-φ-Geraghty quasi-contraction type mappings and proved the existence of its unique fixed point as follows. Definition 1.3 [22]. Let (X, d) be a metric space and α :…”

Best Proximity Points for Generalized Geraghty Quasi-Contraction Type Mappings in Metric Spaces

“…Firstly, we restate the class of mappings introduced in Umudu et al [23] and fixed point results as follows: Definition 2.1. Let (X, d) be a metric space and γ : X ×X → R + .…”

“…Since then, many authors have generalized and extended this result in diverse ways see ( [5], [13], [12], [17] and [23]). Meanwhile, Ciric [7] defined the following concepts and proved the following fixed point result.…”

Geraghty-Ciric type mappings with an application

A study of k- Contraction and the Triangular a Orbital Admissibility Condition in Quasi-metric Space