Rehana Tabassum scite author profile

<div>The purpose of this article is to extend the results derived through former articles with respect to the notion of weak contraction into intuitionistic fuzzy weak contraction in the context of (T,N,∝) -cut set of an intuitionistic fuzzy set. We intend to prove common fixed point theorem for a pair of intuitionistic fuzzy mappings satisfying weakly contractive condition in a complete metric space which generalizes many results existing in the literature. Moreover, concrete results on existence of the solution of a delay differential equation and a system of Riemann-Liouville Cauchy type problems have been derived. In addition, we also present illustrative examples to substantiate the usability of our main result.</div>

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Intuitionistic Fuzzy Fixed Point Theorems in Complex-Valued $b$ -Metric Spaces with Applications to Fractional Differential Equations

Tabassum

Shagari

Azam³

et al. 2022

Journal of Function Spaces

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Among various efforts in advancing fuzzy mathematics, a lot of attentions have been paid to examine novel intuitionistic fuzzy analogues of the classical fixed point results. Along this direction, the idea of intuitionistic fuzzy mapping (IFM) is used in this paper to establish some fixed point (FP) results in complex-valued b -metric spaces. Moreover, from application perspective, one of our results is rendered to provide an existence condition for a solution of Caputo-type fractional differential equations. A few nontrivial illustrations are also furnished to authenticate and indicate the usability of the presented results.

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Feng-Liu’s Approach to Fixed Point Results of Intuitionistic Fuzzy Set-Valued Maps

et al. 2023

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The applications of non-zero self distance function have recently been discovered in both symmetric and asymmetric spaces. With respect to invariant point results, the available literature reveals that the idea has only been examined for crisp mappings in either symmetric or asymmetric spaces. Hence, the aim of this paper is to introduce the notion of invariant points for non-crisp set-valued mappings in metric-like spaces. To this effect, the technique of κ-contraction and Feng-Liu’s approach are combined to establish new versions of intuitionistic fuzzy functional equations. One of the distinguishing ideas of this article is the study of fixed point theorems of intuitionistic fuzzy set-valued mappings without using the conventional Pompeiu–Hausdorff metric. Some of our obtained results are applied to examine their analogues in ordered metric-like spaces endowed with an order and binary relation as well as invariant point results of crisp set-valued mappings. By using a comparative example, it is observed that a few important corresponding notions in the existing literature are complemented, unified and generalized.

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Rehana Tabassum

Existence of common coincidence point of intuitionistic fuzzy maps

Existence results of delay and fractional differential equations via fuzzy weakly contraction mapping principle

Intuitionistic Fuzzy Fixed Point Theorems in Complex-Valued $b$ -Metric Spaces with Applications to Fractional Differential Equations

Feng-Liu’s Approach to Fixed Point Results of Intuitionistic Fuzzy Set-Valued Maps

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Rehana Tabassum

Existence of common coincidence point of intuitionistic fuzzy maps

Existence results of delay and fractional differential equations via fuzzy weakly contraction mapping principle

Intuitionistic Fuzzy Fixed Point Theorems in Complex-Valued b -Metric Spaces with Applications to Fractional Differential Equations

Feng-Liu’s Approach to Fixed Point Results of Intuitionistic Fuzzy Set-Valued Maps

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Product

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Intuitionistic Fuzzy Fixed Point Theorems in Complex-Valued $b$ -Metric Spaces with Applications to Fractional Differential Equations