Abstract
In several ways, related fixed point theorems on two or three metric spaces have been demonstrated. By applying contractive condition of integral type for class of weakly compatible maps in uncompleted intuitionistic fuzzy metric spaces without considering any continuous mappings, in this paper, we verify some frequent fixed point theorems for different mappings.
Highlights
Map where X represents the totality of all fuzzy points of a set and satisfy some axioms which are analogous to the
Mishra et al (2010) proved some fixed point theorems for weakly compatible maps in fuzzy metric space satisfying integral type inequality but without assuming the completeness of the space or continuity of the mappings involved
Some fixed point results for mappings satisfying an integral type contractive condition
Summary
Map where X represents the totality of all fuzzy points of a set and satisfy some axioms which are analogous to the. In 1922, Banach a polish mathematician proved a theorem under appropriate conditions and showed the existence and uniqueness of a fixed point this result is called Banach fixed point theorem. This theorem is applied to prove the existence and uniqueness of the ordinary metric axioms. In such an approach numerical distances are set up between fuzzy objects. Many authors have made different generalization of Banach fixed theorem
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