This edited volume provides a comprehensive exploration of neutrosophic methodologies, emphasizing their computational frameworks, theoretical advancements, and practical applications. It aims to make neutrosophic theory more accessible and applicable to a wider audience, including researchers, practitioners, and students.
This edited volume provides a comprehensive exploration of neutrosophic methodologies, emphasizing their computational frameworks, theoretical advancements, and practical applications. Neutrosophic logic, originally developed to address problems involving vague, inconsistent, incomplete, or unclear information, has evolved significantly over the years. Its extensions have found relevance across diverse disciplines, offering innovative solutions to challenges in science, economics, environmental studies, healthcare, and more.
The book highlights the limitations of traditional mathematical and statistical models in handling the complexity and uncertainty inherent in modern systems. While existing frameworks have contributed to uncertainty modeling, they often fail to treat indeterminacy as a distinct and independent component of information. Neutrosophic theory addresses this gap, providing a robust foundation for analyzing and optimizing systems characterized by indeterminacy.
Key features of the book include:
- Computational Toolboxes: Practical tools for estimating unknown values, simulating results, and making decisions using neutrosophic models. These computational approaches enable practitioners to analyze systems that are too complex for traditional analytical methods.
- Applications Across Disciplines: Detailed examples and case studies demonstrating the use of neutrosophic models in science, engineering, medical diagnostics, environmental modeling, economics, and decision-making under uncertainty.
- Accessibility and Adaptability: By focusing on computational approaches, the book aims to make neutrosophic theory more accessible and applicable to a wider audience, including researchers, practitioners, and students.
This volume serves as a valuable resource for anyone seeking to understand and apply neutrosophic logic to real-world scenarios. It bridges the gap between theoretical advancements and practical applications, empowering readers to tackle complex problems with innovative solutions grounded in neutrosophic methodologies.
1. Matrices of Neutrosophic Numbers: An Overview
2. A Computational
Study of Neutrosophic Probability, with Focus on Risk Evaluation
3.
Optimization Algorithms in Nonstandard Neutrosophic Environments: A
Metaheuristic Approach
4. An Algebraic Approach to Interval-Valued
Neutrosophic Oversets and Undersets
5. Neutrosophic Graph Rewriting as a
Computational Model
6. A Novel Correlation Coefficient Between Single-Valued
Neutrosophic Sets and Its Use in Renewable Energy Source Selection
7. Several
Similarity Measures of Trigonometric Functions for Refined Neutrosophic Sets
and Their Application in Medical Diagnosis
8. Enhancing Antiviral Drug
Repurposing for Future Pandemics with a Linguistic Single-Valued Neutrosophic
MAGDM Framework
9. Weighted Adjustable Level and Graded Utility
Decision-Making Frameworks Based on Neutrosophic Soft Sets
10. Neutrosophic
ISOCOV in Smart and Sustainable Material Selection
11. Latin Square Designs
under Indeterminacy: Data Analysis and Applications
12. Neutrosophic
Programming Approach for Mixed Allocations in Multivariate-Multiobjective
Nonlinear Stratified Sampling Problem with Parabolic Fuzzy Numbers
13. A
Neutrosophic Control Chart for the Conway-Maxwell-Poisson Distribution Using
Multiple Dependent State Sampling
14. A Hierarchical Framework for Assessing
Groundwater Quality Using Evidential Neutrosophic Tree Soft Sets
15. An
Innovative Trapezoidal Neutrosophic CRADIS Algorithm Using Multiple-Attribute
Group Decision-Making for Sharia Bank Branch Location Selection
16. A Novel
Approach for the Shortest Path Computation in Networks Using
Quadripartitioned Single-Valued Neutrosophic Refined Numbers
Florentin Smarandache, PhD, PostDocs, is an Emeritus Professor of Mathematics at the University of New Mexico, United States. He earned his PhD in Mathematics from the State University of Kishinev, and Postdoctoral in Applied Mathematics from Okayama University of Sciences, Japan, and The Guangdong University of Technology, Guangzhou, China. He is the founder of neutrosophy (generalization of dialectics), neutrosophic set, logic, probability and statistics since 1995 and has published hundreds of papers and books on neutrosophic physics, superluminal and instantaneous physics, unmatter, quantum paradoxes, absolute theory of relativity, redshift and blueshift due to the medium gradient and refraction index besides the Doppler effect, paradoxism, outerart, neutrosophy as a new branch of philosophy, Law of Included Multiple-Middle, multispace and multistructure, HyperSoft set, TreeSoft Set, IndetermSoft Set and IndetermHyperSoft Set, SuperHyperGraph, SuperHyperTopology, SuperHyperAlgebra, SuperHyperFunction, Neutrosophic SuperHyperAlgebra, degree of dependence and independence between neutrosophic components, refined neutrosophic set, neutrosophic over-under-off-set, plithogenic set / logic / probability / statistics, symbolic plithogenic algebraic structures, neutrosophic triplet and duplet structures, quadruple neutrosophic structures, extension of algebraic structures to NeutroAlgebra and AntiAlgebra, NeutroGeometry and AntiGeometry, NeutroTopology and AntiTopology, Refined Neutrosophic Topology, Refined Neutrosophic Crisp Topology, Dezert-Smarandache Theory and so on in many peer-reviewed international journals publishers. Additionally he also presented papers and plenary lectures to many international conferences around the world.
Zahid Khan, PhD, is currently working as a scientific co-research fellow in the Department of Quantitative Methods at the University of Pannonia, Hungary. He holds a permanent position as an Associate Professor in the Department of Mathematics and Statistics at Hazara University, Pakistan. He earned his PhD from the University Technology PETRONAS, Malaysia, in 2017. His research interests encompass robust estimation in fuzzy probability distributions, neutrosophic statistics, and statistical methods for industrial process control. Dr. Khan received the Talent Award Scholarship from the Higher Education Commission of Pakistan in 2006, a fellowship from Quaid-i-Azam University in 2007, and another fellowship from University Technology PETRONAS in 2013.
