A singular-perturbed two-phase Stefan problem |
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| Affiliation: | Department of Mathematics Universität Kaiserslautern P.O. Box 3049 67653 Kaiserslauten, Germany |
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| Abstract: | The asymptotic behavior of a singular-perturbed two-phase Stefan problem due to slow diffusion in one of the two phases is investigated. In the limit, the model equations reduce to a one-phase Stefan problem. A boundary layer at the moving interface makes it necessary to use a corrected interface condition obtained from matched asymptotic expansions. The approach is validated by numerical experiments using a front-tracking method. |
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