Numerical Solution for Two-Sided Stefan Problem
Author(s) -
Zahraa Adil,
M. S. Hussein
Publication year - 2020
Publication title -
iraqi journal of science
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.152
H-Index - 4
eISSN - 2312-1637
pISSN - 0067-2904
DOI - 10.24996/ijs.2020.61.2.24
Subject(s) - mathematics , stefan problem , transformation (genetics) , boundary value problem , boundary (topology) , free boundary problem , nonlinear system , dirichlet problem , crank–nicolson method , mathematical analysis , parabolic partial differential equation , dirichlet boundary condition , heat equation , simple (philosophy) , boundary problem , space (punctuation) , partial differential equation , scheme (mathematics) , computer science , physics , gene , operating system , epistemology , philosophy , chemistry , quantum mechanics , biochemistry
In this paper, we consider a two-phase Stefan problem in one-dimensional space for parabolic heat equation with non-homogenous Dirichlet boundary condition. This problem contains a free boundary depending on time. Therefore, the shape of the problem is changing with time. To overcome this issue, we use a simple transformation to convert the free-boundary problem to a fixed-boundary problem. However, this transformation yields a complex and nonlinear parabolic equation. The resulting equation is solved by the finite difference method with CrankNicolson scheme which is unconditionally stable and second-order of accuracy in space and time. The numerical results show an excellent accuracy and stable solutions for two test examples.
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