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Numerical Solution for Two-Sided Stefan Problem

Zahraa Adil, M. S. Hussein

2020Iraqi Journal of Science12 citationsDOIOpen Access PDF

Abstract

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 Crank-Nicolson 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.

Topics & Concepts

MathematicsStefan problemTransformation (genetics)Boundary value problemBoundary (topology)Free boundary problemNonlinear systemDirichlet problemCrank–Nicolson methodMathematical analysisParabolic partial differential equationDirichlet boundary conditionHeat equationSimple (philosophy)Boundary problemSpace (punctuation)Partial differential equationApplied mathematicsScheme (mathematics)Computer sciencePhysicsGeneOperating systemEpistemologyPhilosophyChemistryQuantum mechanicsBiochemistryDifferential Equations and Numerical Methods
Numerical Solution for Two-Sided Stefan Problem | Litcius