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ON FRACTAL-FRACTIONAL WATERBORNE DISEASE MODEL: A STUDY ON THEORETICAL AND NUMERICAL ASPECTS OF SOLUTIONS VIA SIMULATIONS

Hasib Khan, Jehad Alzabut, Anwar Shah, Zai-Yin He, Sina Etemad, Shahram Rezapour, Akbar Zada

2023Fractals139 citationsDOIOpen Access PDF

Abstract

Waterborne diseases are illnesses caused by pathogenic bacteria that spread through water and have a negative influence on human health. Due to the involvement of most countries in this vital issue, accurate analysis of mathematical models of such diseases is one of the first priorities of researchers. In this regard, in this paper, we turn to a waterborne disease model for solution’s existence, HU-stability, and computational analysis. We transform the model to an analogous fractal-fractional integral form and study its qualitative analysis using an iterative convergent sequence and fixed-point technique to see whether there is a solution. We use Lagrange’s interpolation to construct numerical algorithms for the fractal-fractional waterborne disease model in terms of computations. The approach is then put to the test in a case study, yielding some interesting outcomes.

Topics & Concepts

FractalInterpolation (computer graphics)Applied mathematicsMathematicsStability (learning theory)Waterborne diseasesConstruct (python library)Fractional calculusSequence (biology)Computer scienceMathematical analysisArtificial intelligenceEcologyBiologyGeneticsMotion (physics)Machine learningProgramming languageWater qualityFractional Differential Equations Solutions
ON FRACTAL-FRACTIONAL WATERBORNE DISEASE MODEL: A STUDY ON THEORETICAL AND NUMERICAL ASPECTS OF SOLUTIONS VIA SIMULATIONS | Litcius