The Convex (δ, L) Weak Contraction Mapping Theorem and its Non Self Counterpart in Graphic Language
Keywords:
(δ, L) weak contraction, convex contraction, non-self map, graph, fixed point theorem, best proximity point theorem
Abstract
Let 
be a metric space. A map 
is said to be a 
weak contraction [1] if there exists 
and 
such that the following inequality holds for all 
On the other hand, the idea of convex contractions appeared in [2] and [3]. In the first part of this paper, motivated by [1]-[3], we introduce a concept of convex 
weak contraction, and obtain a fixed point theorem associated with this mapping. In the second part of this paper, we consider the map is a non-self map, and obtain a best proximity point theorem. Finally, we leave the reader with some open problems.
Published
2019-02-26
How to Cite
Ampadu, C. B. (2019). The Convex (δ, L) Weak Contraction Mapping Theorem and its Non Self Counterpart in Graphic Language . Earthline Journal of Mathematical Sciences, 1(2), 157-169. https://doi.org/10.34198/ejms.1219.157169
Issue
Section
Articles
This work is licensed under a Creative Commons Attribution 4.0 International License.
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