Abstract:We establish some common best proximity point results for generalized α − ψ-proximal contractive non-self mappings. We provide some concrete examples. We also derive some consequences on some best proximity results on a metric space endowed with a graph.
“…From (17), d(x N+1 , x N ) = dist(A, B), we conclude that {d(x N+1 , x N )} N is a constant sequence equal to dist(A, B). Therefore, from (31), d(x * , f x * ) = dist(A, B).…”
Section: Definition 11 Let Fmentioning
confidence: 79%
“…There are many variants and extensions of results for the existence of a best proximity point. For more details, we refer to References [15][16][17][18][19][20][21][22][23][24][25][26][27][28][29].…”
“…From (17), d(x N+1 , x N ) = dist(A, B), we conclude that {d(x N+1 , x N )} N is a constant sequence equal to dist(A, B). Therefore, from (31), d(x * , f x * ) = dist(A, B).…”
Section: Definition 11 Let Fmentioning
confidence: 79%
“…There are many variants and extensions of results for the existence of a best proximity point. For more details, we refer to References [15][16][17][18][19][20][21][22][23][24][25][26][27][28][29].…”
“…We would like to finish with an open question. Is it possible to generalize the results about best proximity points in reflexive Banach spaces for other type of maps such as the investigated in [2][3][4][5]18]?…”
We generalize the p-summing contractions maps. We found sufficient conditions for these new type of maps, that ensure the existence and uniqueness of best proximity points in uniformly convex Banach spaces. We apply the result for Kannan and Chatterjea type cyclic contractions and we obtain sufficient conditions for these maps, that ensure the existence and uniqueness of best proximity points in uniformly convex Banach spaces.
“…Many authors have proved the existence and uniqueness of common fixed points of contraction self mappings in metric spaces and its generalizations (see Karapinar [12], Abdeljawad et al [2], Aydi et al [6], Aydi et al [7]). Much work have been done on the approximation of fixed points of contraction mappings (see [3,14,15]).…”
Section: Introduction and Preliminary Definitionsmentioning
In this paper, we introduce a class of nonlinear contractive mappings in metric space. We also establish common fixed point theorems for these pair of non-self mappings satisfying the new contractive conditions in the convex metric space . An example is given to validate our results. The results generalize and extend some results in literature.
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