Author(s): GEORGE ANASTASSIOU
Series: APPLIED MATH, VOLUME 31
Edition: FIRST
Publisher: EUDOXUS PRESS, LLC, www.eudoxuspress.com
Year: 2023
Language: ENGLISH
Commentary: 656 PAGES
Pages: 656
City: CORDOVA
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Paper 1
Paper 2
Paper 3
Paper 4
Introduction
Taylor series expansion method
Fundamental approach to solve space-fractional PDEs
Fundamental approach to solve time-fractional PDEs
Numerical examples
Solution of SFTE
Solution of TFTE
Conclusion
Paper 5
Paper 6
Paper 7
Introduction
Model formation
SEAIQHRDP model analysis
Positivity and boundedness
Basic reproduction number
Disease-free equilibrium Stability analysis
Numerical simulation
Sensitivity analysis
COVID-19 Prevalence changes with various parameters
Optimal control
Optimal control problem
Optimal control model simulation
Conclusion
Paper 8
Introduction
Preliminaries
Nonempty intersection results using Hausdorff distance
Comparison with Cantor's theorem
Nonempty intersection in Atsuji space
Nonempty intersection results using
Comparison with Cantor's theorem
Conclusion
Paper 9
Introduction
Multi-objective linear transportation problem (MOLTP)
Methods for solving MOLTP
Weighted sum method
Method proposed by Nomani(2016)
Proposed Method
Numerical illustration
Conclusion
Paper 10
Introduction
Some Essential Theorems
Model Formulation
Existence of the solutions
Boundedness
Existence of points of equilibrium
Numerical Simulation
Conclusion
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Introduction
Main Results:
Lemmas:
Proof of Main results:
Solution of theorem 2.1:
Explanation of theorem 2.3:
Paper 14
Introduction
Problem Structure:
Results and Discussion:
Conclusion:
Paper 15
Paper 16
Paper 17
Paper 18
Paper 19
Paper 20
Introduction
Model Formation
Analysis of the SEITR model
Positivity and boundedness
Basic Reproduction Number
Local Stability of Disease Free Equilibrium
Global Stability of Disease Free Equilibrium
Local Stability of Endemic Equilibrium point
Numerical Simulation
Analysis of results
Discussion of results
CONCLUSION
Paper 21
Introduction:
Construction of the Problem:
Influence of Diverse Restrictions
Conclusions
Paper 22
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Introduction
Preliminaries
Variational Iteration Method
Conclusion:
References
Paper 26
Paper 27
Introduction
Model Description
The Two-Dimensional State Model
Notations
The Difference-Differential equations governing the system are:
Solution of the Problem
Verification of Results
Numerical Solution and Graphical Representation
Busy Period Probabilities
Numerical and Graphical Representation of Busy Period Probabilities
Conclusion
Acknowledgment
Paper 28
Introduction
Literature Review
Preliminaries
Fuzzy Number
Linear Programming framework for the Tourism Development Problem
Model Developments
DECISION MAKING IN A FUZZY SCENARIO zadeh1996fuzzy
Wernerâ•Žs Method werners1987interactive
Chanas chanas1983use & Verdegayâ•Žs Approach verdegay1982fuzzy,verdegay1984applications
Solution of Zimmermann zimmermann1985applications,zimmermann1975description
PROBLEM WITH VARYING TOLERANCES AND GRAPHICAL INTERPRETATIONS USING WERNERâ•ŽS METHOD
Zimmermann Approach tanaka1973fuzzy
RESULTS AND DISCUSSIONS
Conclusion
Paper 29
Paper 30-SIROUNI
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Introduction
Preliminaries
Definitions and Basic Results
Fuzzy-Two-Coupled Non-linear Differential Equations
Analytical Solution, Semi Analytical Solution
Fuzzy Laplace Adomian Decomposition Method
Modified Fuzzy RK-4 Algorithm:
An Example
Numerical Simlations
Conclusion
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