Numerical-analytical method for solving initial-boundary value problem for loaded parabolic equation
DOI:
https://doi.org/10.31489/2025m1/34-45Keywords:
loaded parabolic equations, initial-boundary value problem, solvability conditions, parameterization method, polygonal method, numerical solutionAbstract
An initial-boundary value problem for a loaded parabolic equation in a rectangular domain was considered. By discretization with respect to a spatial variable, the problem under study is reduced to the initial problem for a system of loaded ordinary differential equations. Based on the previously obtained results of Dzhumabaev and Assanova, an estimate for the solution of the original initial-boundary value problem for a loaded parabolic equation was established. An auxiliary initial problem for a system of loaded ordinary differential equations is solved by the Dzhumabaev parameterization method. Conditions of the unique solvability of the considering problem are obtained and algorithms for finding a solution are constructed. The results are illustrated with a numerical example.
