Abstract
The aim of this is to study fixed point theorems in bν(s)-metric spaces under the Pata-type conditions. As consequences, we establish common fixed point results of Pata-type for two maps in bν(s)- metric spaces.
Highlights
The Banach contraction principle introduced by Banach [6] is one of the most important results in mathematical analysis
The aim of this is to study fixed point theorems in bν (s)-metric spaces under the Pata-type conditions
Some generalizations of the notion of a metric space have been proposed by some authors, such as, rectangular metric spaces, semi metric spaces, pseudo metric spaces, probabilistic metric spaces, fuzzy metric spaces, quasi metric spaces, quasi semi metric spaces, D metric spaces, and cone metric spaces
Summary
The Banach contraction principle introduced by Banach [6] is one of the most important results in mathematical analysis.
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