Exploring the Differential Geometry of Reliability Function: Insights from Lifetime Weibull Distributions Under Neutrosophic Environment

Exploring the Differential Geometry of Reliability Function: Insights from Lifetime Weibull Distributions Under Neutrosophic Environment

This paper characterizes a set N as a two-dimensional surface marked by 𝑅 + × 𝑅 + and demonstrates its properties as a topological 2-reliability manifold and a differential reliability manifold. Utilizing the Weibull lifetime distribution, we derive the formula for the Riemannian manifold (𝑁, 𝑔𝑖𝑗)....

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Bibliographic Details
Main Authors: Nada Mohammed Abbas, Ghazi Abdullah, Ahmed Hadi Hussain
Format: Article
Language:English
Published: University of New Mexico 2025-06-01
Series:Neutrosophic Sets and Systems
Subjects:
parametric model
reliability function
weibull distribution
manifold (topological & differentiable)
chart & atlas
riemannian geometry
log-likelihood function
critical point & saddle point
neutrosophic reliability function
neutrosophic random variable
neutrosophic topological space
neutrosophic manifold
homogeneous neutrosophic differential transformation
Online Access:https://fs.unm.edu/NSS/29DifferentialGeometry.pdf
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Summary:This paper characterizes a set N as a two-dimensional surface marked by 𝑅 + × 𝑅 + and demonstrates its properties as a topological 2-reliability manifold and a differential reliability manifold. Utilizing the Weibull lifetime distribution, we derive the formula for the Riemannian manifold (𝑁, 𝑔𝑖𝑗). Finally, we prove that the reliability function represents the critical point of its log-likelihood on the manifold, which also serves as the saddle point. Also, we discuss the same results in a neutrosophic environment, with neutrosophic variables and coefficients from the neutrosophic real ring R(I), where we get similar results of the original approach.
ISSN:2331-6055
2331-608X

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