Uniqueness of Stationary Distribution in Markov Processes: A Quintuple Fixed Point and Coincidence Point Approach

Samina Batul; Sidra Fida; Dur E.Shehwar Sagheer; Hassen Aydi; Saber Mansour

doi:10.29020/nybg.ejpam.v18i2.6131

Uniqueness of Stationary Distribution in Markov Processes: A Quintuple Fixed Point and Coincidence Point Approach

Samina Batul^*, Sidra Fida, Dur E.Shehwar Sagheer, Hassen Aydi, Saber Mansour

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

Abstract

This article introduces the concept of quintuple fixed points and coincidence points for matrix-related mappings in generalized metric spaces. Furthermore, the existence of quintuple coincidence points is established. This task is achieved by leveraging the structure of matrices. We derive several corollaries as special cases of our main results. These corollaries provide evidence for the authentication of the proven results. To validate the significance of our findings, we provide a selection of non-trivial examples. Eventually, we demonstrate the practical applicability of our established results by applying them to determine the stationary distribution of a Markov process.

Original language	English
Article number	6131
Journal	European Journal of Pure and Applied Mathematics
Volume	18
Issue number	2
DOIs	https://doi.org/10.29020/nybg.ejpam.v18i2.6131
Publication status	Published - Apr 2025
Externally published	Yes

Keywords

Generalized metric space (GMs)
Markov Process
Partially Ordered Metric Spaces (PoM)
Quintuple Fixed Point(QFP)
Tripled fixed point (TFp)

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10.29020/nybg.ejpam.v18i2.6131

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title = "Uniqueness of Stationary Distribution in Markov Processes: A Quintuple Fixed Point and Coincidence Point Approach",

abstract = "This article introduces the concept of quintuple fixed points and coincidence points for matrix-related mappings in generalized metric spaces. Furthermore, the existence of quintuple coincidence points is established. This task is achieved by leveraging the structure of matrices. We derive several corollaries as special cases of our main results. These corollaries provide evidence for the authentication of the proven results. To validate the significance of our findings, we provide a selection of non-trivial examples. Eventually, we demonstrate the practical applicability of our established results by applying them to determine the stationary distribution of a Markov process.",

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AU - Batul, Samina

AU - Fida, Sidra

AU - Sagheer, Dur E.Shehwar

AU - Aydi, Hassen

AU - Mansour, Saber

PY - 2025/4

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N2 - This article introduces the concept of quintuple fixed points and coincidence points for matrix-related mappings in generalized metric spaces. Furthermore, the existence of quintuple coincidence points is established. This task is achieved by leveraging the structure of matrices. We derive several corollaries as special cases of our main results. These corollaries provide evidence for the authentication of the proven results. To validate the significance of our findings, we provide a selection of non-trivial examples. Eventually, we demonstrate the practical applicability of our established results by applying them to determine the stationary distribution of a Markov process.

AB - This article introduces the concept of quintuple fixed points and coincidence points for matrix-related mappings in generalized metric spaces. Furthermore, the existence of quintuple coincidence points is established. This task is achieved by leveraging the structure of matrices. We derive several corollaries as special cases of our main results. These corollaries provide evidence for the authentication of the proven results. To validate the significance of our findings, we provide a selection of non-trivial examples. Eventually, we demonstrate the practical applicability of our established results by applying them to determine the stationary distribution of a Markov process.

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KW - Markov Process

KW - Partially Ordered Metric Spaces (PoM)

KW - Quintuple Fixed Point(QFP)

KW - Tripled fixed point (TFp)

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Uniqueness of Stationary Distribution in Markov Processes: A Quintuple Fixed Point and Coincidence Point Approach

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