Fixed Point Theorems in Complete Partial G-Metric Spaces for Generalized Contractive Conditions of the Cyclical Type

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Published: Apr 16, 2014

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Clement Boateng Ampadu

Abstract

This paper proves some fixed point theorems for generalized contractions defined on cyclic representation in the setting of partial G-metric spaces.

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How to Cite
Ampadu, C. B. (2014). Fixed Point Theorems in Complete Partial G-Metric Spaces for Generalized Contractive Conditions of the Cyclical Type. Journal of Global Research in Mathematical Archives(JGRMA), 1(11), 21–29. Retrieved from https://jgrma.com/index.php/jgrma/article/view/117
Issue
Vol. 1 No. 11 (2013): November-2013
Section
Research Paper
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Author Biography

Clement Boateng Ampadu

Prof. Ampadu is a mathematician and  self-made quantum physicist. He got his PhD in Mathematics from Central Michigan University, where he studied the interplay between random walks and partial differential equations. Prior to that he got his MA from the University of Central Arkansas and his BS from Northeastern University in Boston.  He has several hobbies and interests. Nowadays, he works intensely on stochastic processes in quantum physics, especially the quantum walk and the open quantum random walk. He has been a speaker at many international conferences. Recently, he has added metric fixed point theory to his research interest. Â