Solutions for the Stefan problem with Gibbs-Thomson law by a local minimisation
Interfaces and free boundaries, Tome 6 (2004) no. 1, pp. 105-133
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A new construction scheme for a time-discrete version of the Stefan problem with Gibbs-Thomson law is introduced. Extending a scheme due to Luckhaus our approach uses a local minimisation of certain penalised functionals instead of minimising these functionals globally. The main difference is that local minimisation allows for surface loss of approximate phase interfaces in the limit. The theory of varifolds is used to obtain the convergence of approximate Gibbs-Thomson equations. A particular situation exhibits that local minimisation provides more physically appealing solutions than those constructed by global minimisation.
Classification :
35-XX, 65-XX, 76-XX, 92-XX
Mots-clés : Stefan problem, local minimisation
Mots-clés : Stefan problem, local minimisation
Affiliations des auteurs :
Matthias Röger 1
Matthias Röger. Solutions for the Stefan problem with Gibbs-Thomson law by a local minimisation. Interfaces and free boundaries, Tome 6 (2004) no. 1, pp. 105-133. doi: 10.4171/ifb/93
@article{10_4171_ifb_93,
author = {Matthias R\"oger},
title = {Solutions for the {Stefan} problem with {Gibbs-Thomson} law by a local minimisation},
journal = {Interfaces and free boundaries},
pages = {105--133},
year = {2004},
volume = {6},
number = {1},
doi = {10.4171/ifb/93},
url = {http://geodesic.mathdoc.fr/articles/10.4171/ifb/93/}
}
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