Numerical Solution of Reaction-Diffusion Equations With Convergence Analysis
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Date
2023
Journal Title
Journal ISSN
Volume Title
Publisher
Springernature
Open Access Color
GOLD
Green Open Access
No
OpenAIRE Downloads
OpenAIRE Views
Publicly Funded
No
BIP! Indicators
Impulse
Top 10%
Influence
Average
Popularity
Top 10%
Abstract
In this manuscript, we implement a spectral collocation method to find the solution of the reaction-diffusion equation with some initial and boundary conditions. We approximate the solution of equation by using a two-dimensional interpolating polynomial dependent to the Legendre-Gauss-Lobatto collocation points. We fully show that the achieved approximate solutions are convergent to the exact solution when the number of collocation points increases. We demonstrate the capability and efficiency of the method by providing four numerical examples and comparing them with other available methods.
Description
Keywords
Reaction-Diffusion Equations, Spectral Collocation Method, Shifted Legendre-Gauss-Lobatto Points, Convergence Analysis, Shifted Legendre–Gauss–Lobatto Points, Reaction–Diffusion Equations, Economics, Collocation (remote sensing), Diffusion equation, Polynomial, Mathematical analysis, Quantum mechanics, Diffusion, Differential equation, Numerical Methods for Singularly Perturbed Problems, Service (business), Numerical Integration Methods for Differential Equations, Orthogonal collocation, Machine learning, FOS: Mathematics, Reaction-Diffusion Equations, Convection-Diffusion Problems, Spectral method, Boundary value problem, Anomalous Diffusion Modeling and Analysis, Collocation method, Economic growth, Numerical Analysis, Time-Fractional Diffusion Equation, Physics, Economy, Applied mathematics, Computer science, Reaction–diffusion system, Modeling and Simulation, Physical Sciences, Convergence (economics), Gauss, Legendre polynomials, Thermodynamics, Mathematics, Ordinary differential equation, Numerical analysis, convergence analysis, spectral collocation method, shifted Legendre-Gauss-Lobatto points, reaction-diffusion equations, Reaction-diffusion equations, Stability and convergence of numerical methods for initial value and initial-boundary value problems involving PDEs, Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs
Fields of Science
01 natural sciences, 0101 mathematics
Citation
Heidari M.;...et.al. (2023). "Numerical Solution of Reaction–Diffusion Equations with Convergence Analysis", Journal of Nonlinear Mathematical Physics, Vol.30, No.2, pp.384-399.
WoS Q
Q2
Scopus Q
Q3
OpenCitations Citation Count
5
Source
Journal of Nonlinear Mathematical Physics
Volume
30
Issue
2
Start Page
384
End Page
399
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Citations
Scopus : 10
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Mendeley Readers : 7
SCOPUS™ Citations
10
checked on Apr 10, 2026
Web of Science™ Citations
8
checked on Apr 10, 2026
Page Views
1
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