On the Stefan Problem with Different Phase Densities

Both one-dimensional two-phase Stefan problem with the thermodynamic equilibrium condition uðRðtÞ; tÞ ¼ 0 and with the kinetic rule u e ðR e ðtÞ; tÞ ¼ eR 0 e ðtÞ at the moving boundary are considered. We prove, when e approaches zero, R e ðtÞ converges to RðtÞ in C 1þd=2 ½0; T for any finite T > 0;

This paper considers a boundary integral approach to Stefan problems that have multiple phase changes and satisfy the Laplace equation in each phase. It is shown that, by introducing artificial phase changes, the effects of moderate diffusivity can be incorporated. The paper includes the results fro

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