NUMERICAL INVESTIGATION OF THE GROWTH- DIFFUSION MODEL

Journal > Journal > Journal Vol – 18 No -7, July 2023 > NUMERICAL INVESTIGATION OF THE GROWTH- DIFFUSION MODEL

July 24, 2023

Journal Vol – 18 No -7, July 2023

Authors:

Jawad Kadhim Tahir,

DOI NO:

https://doi.org/10.26782/jmcms.2023.07.00001

Keywords:

growth-diffusion problem,modified finite difference method,central difference,non-classical variational,

Abstract

In this article, a numerical solution to the growth-diffusion problem is investigated by obtaining the results of computational experiments for the non-homogeneous growth-diffusion problem and finding its approximate solution by using the modified finite difference method. In this article, a numerical study is carried out by the modified finite difference method. The numerical scheme used a second-order central difference in space with a first-order in time.

Refference:

I. Canosa, J., : “On a nonlinear diffusion equation describing population growth”. IBM Journal of Research and Development. vol. 17.pp 307, 1973.
II. Chern, C. Gui, W.-M. Ni, X., : “Wang Further study on a nonlinear heat equation”. J. Differential Equations, 169, pp. 588-613, 2001.
III. Maud El-Hachem, Scott W. McCue, Matthew J. Simpson, : “A Continuum Mathematical Model of Substrate-Mediated Tissue Growth”. : Bulletin of Mathematical Biology, vol.84, no.4, 2022.
IV. Melike KARTA, : “Numerical Method for Approximate Solution of Fisher’s Equation”. Journal of the Institute of Science and Technology, pp.435, 2022.
V. Mizoguchi, N., : “On the behavior of solutions for a semilinear parabolic equation with supercritical nonlinearity”. Math. Z., 239, pp. 215-229, 2002.
VI. Mohammad Izadi, “A second-order accurate finite-difference scheme for the classical Fisher-Kolmogorov-Petrovsky-Piscounov equation”. : Journal of Information and Optimization Sciences, vol.42, no.2, pp.431, 2021.
VII. Muhammad Z. Baber, Aly R. Seadway, Muhammad S. Iqbal, Nauman Ahmed, Muhammad W. Yasin, Muhammad O. Ahmed, : “Comparative analysis of numerical and newly constructed soliton solutions of stochastic Fisher-type equations in a sufficiently long habitat”, International Journal of Modern Physics B, vol.37, no.16, 2023.
VIII. Shahid Hasnain, Muhammad Saqib, Muhammad F. Afzaal, Iqtadar Hussain, : “Numerical Study to Coupled Three Dimensional Reaction Diffusion System”. IEEE Access, vol.7, pp.46695-46705, 2019.
IX. Tahir, J.K., : “NUMERICAL EXPERIMENTS FOR NONLINEAR BURGER’S PROBLEM”. J. Mech. Cont. & Math. Sci., Vol.-16, No.-11, November (2021) pp 11-25.

View Download