On the behaviors of solutions of a nonlinear diffusion system with a source and nonlinear boundary conditions
Loading...
Files
Date
Authors
Journal Title
Journal ISSN
Volume Title
Publisher
Академик Е.А. Бөкетов атындағы Қарағанды университеті
Abstract
We study the global solvability and unsolvability of a nonlinear diffusion system with nonlinear boundary
conditions in the case of slow diffusion. We obtain the critical exponent of the Fujita type and the critical
global existence exponent, which plays a significant part in analyzing the qualitative characteristics of
nonlinear models of reaction-diffusion, heat transfer, filtration, and other physical, chemical, and biological
processes. In the global solvability case, the key components of the asymptotic solutions are obtained.
Iterative methods, which quickly converge to the exact solution while maintaining the qualitative characteristics
of the nonlinear processes under study, are known to require the presence of an appropriate initial
approximation. This presents a significant challenge for the numerical solution of nonlinear problems. A
successful selection of initial approximations allows for the resolution of this challenge, which depends on the
value of the numerical parameters of the equation, which are primarily in the computations recommended
using an asymptotic formula. Using the asymptotics of self-similar solutions as the initial approximation
for the iterative process, numerical calculations and analysis of the results are carried out. The outcomes of
numerical experiments demonstrate that the results are in excellent accord with the physics of the process
under consideration of the nonlinear diffusion system.
Description
Citation
Aripov M.M. On the behaviors of solutions of a nonlinear diffusion system with a source and nonlinear boundary conditions/M.M. Aripov, Z.R. Rakhmonov, A.A. Alimov//Қарағанды университетінің хабаршысы. Математика сериясы.= Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda University. Mathematics Series. -2024. №1. Р.28-45.