Litcius/Paper detail

Computational analysis of fuzzy fractional order non-dimensional Fisher equation

Shabir Ahmad, Aman Ullah, Abd Ullah, Ali Akgül, Thabet Abdeljawad

2021Physica Scripta30 citationsDOI

Abstract

Abstract In recent decades, fuzzy differential equations of integer and arbitrary order are extensively used for analyzing the dynamics of a mathematical model of the physical process because crisp operators of integer and arbitrary order are not able to study the model being studied when there is uncertainty in values used in modeling. In this article, we have considered the time-fractional Fisher equation in a fuzzy environment. The basic aim of this article is to deduce a semi-analytical solution to the fuzzy fractional-order non-dimensional model of the Fisher equation. Since the Laplace-Adomian method has a good convergence rate. We use the Laplace- Adomian decomposition method (LADM) to determine a solution under a fuzzy concept in parametric form. We discuss the convergence and error analysis of the proposed method. For the validity of the proposed scheme, we provide few examples with detailed solutions. We provide comparisons between exact and approximate solutions through graphs. In the end, the conclusion of the paper is provided.

Topics & Concepts

Adomian decomposition methodLaplace transformApplied mathematicsMathematicsFuzzy logicParametric statisticsConvergence (economics)Rate of convergenceDifferential equationDecomposition method (queueing theory)Mathematical optimizationComputer scienceMathematical analysisEconomicsChannel (broadcasting)Economic growthDiscrete mathematicsComputer networkStatisticsArtificial intelligenceFuzzy Systems and OptimizationFractional Differential Equations SolutionsNonlinear Differential Equations Analysis