一個史蒂芬類型問題的數值研討

In this thesis, concerning a Stefan-type problem, we study the discontinuous Galerkin approximation of the problem. Based on the symmetric interior penalty Galerkin method, both the semidiscrete and fully discrete schemes are presented and the optimal orders of convergence in L2-norm are also proven. Some numerical experiments are also performed to confirm our theoretical results.

並列關鍵字

Stefan ； discontinuous Galerkin ； semidiscrete ； fully discrete

參考文獻

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4. W.-T. Ang, “A numerical method based on integro-differential formulation for solving a one-dimensional Stefan problem,” Numerical Methods for Partial Differential Equations, 23, no. 3, 939-949, 2008.

5. J. W. Barrett, H. Garcke, and R. Nürnberg, “On stable parametric finite element methods for the Stefan problem and the Mullins-Sekerka problem with applications to dendritic growth,” Journal of Computational Physics, 229, no. 18, 6270-6299, 2010.

6. A. C. Briozzo, and D. A. Tarzia, “A Stefan problem for a non-classical heat equation with a convective condition,” Applied Mathematics and Computation, 217, no. 8, 4051-4060, 2010.

7. E. Javirerre, C. Vuik, F. J. Vermolen, and S. van der Zwaag, “A comparison of numerical models for one-dimensional Stefan problems,” Journal of Computational Applied Mathematics, 192, no. 2, 445-459, 2006.

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一個史蒂芬類型問題的數值研討

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