Abstract

In this paper, we introduce the notions of proximal Berinde g-cyclic contractions of two non-self-mappings and proximal Berinde g-contractions, called proximal Berinde g-cyclic contraction of the first and second kind. Coincidence best proximity point theorems for these types of mappings in a metric space are presented. Some examples illustrating our main results are also given. Our main results extend and generalize many existing results in the literature.

Highlights

  • 1 Introduction Fixed point theory has an important role in the study of theory of nonlinear equations

  • He proved that every weak contraction mapping from a complete metric space X into itself has a fixed point

  • Fixed point theory has great importance in solving nonlinear equations of the form Jx = x, where J is a self-mapping, if J is a non-self-mapping, it is possible that J has no fixed points

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Summary

Introduction

Fixed point theory has an important role in the study of theory of nonlinear equations. Basha [5] proved the existence of the following best proximity point in a complete metric space.

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