METHOD OF LINES FOR A LOADED PARABOLIC EQUATION

Authors

DOI:

https://doi.org/10.26577/JMMCS2025125101

Keywords:

loaded parabolic equations, two-point boundary value problem, method of lines, convergence, parameterization method

Abstract

In a closed domain, a two-point boundary value problem for loaded parabolic equations is considered. The method of lines with respect to the variable x is used to solve this problem. As a result of this approach, a discretized problem is formulated. The discretized problem is reduced to a two-point boundary value problem for loaded differential equations (LDE). The solution of the resulting boundary value problem is performed using the parameterization method developed by professor Dzhumabaev. The study demonstrates the relationship between the boundary value problem for the loaded parabolic equation and the related discretized problem.

 

Author Biographies

  • Kuanysh Saule, Al-Farabi Kazakh National University, Almaty, Kazakhstan

    Doctoral student, Teacher

  • Assanova Anar, Institute of Mathematics and Mathematical Modeling; Kazakh National Women's Teacher Training University, Almaty, Kazakhstan

    Dr. Phys.-Math. Sc., professor, Principal Researcher 

  • Kadirbayeva Zhazira, Institute of Mathematics and Mathematical Modeling; Kazakh National Women's Teacher Training University, Almaty, Kazakhstan

    Candidate of Phys.-Math.Sc., professor, Leading Researcher 

Downloads

Published

2025-03-25

Issue

Vol. 125 No. 1 (2025): Journal of Mathematics, Mechanics and Computer Science

Section

Mathematics

How to Cite

METHOD OF LINES FOR A LOADED PARABOLIC EQUATION. (2025). Journal of Mathematics, Mechanics and Computer Science, 125(1). https://doi.org/10.26577/JMMCS2025125101