The degenerate and non-degenerate Stefan problem with inhomogeneous and anisotropic Gibbs–Thomson law
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Publication:3095770
DOI10.1017/S0956792511000131zbMath1258.35211MaRDI QIDQ3095770
Publication date: 4 November 2011
Published in: European Journal of Applied Mathematics (Search for Journal in Brave)
phase transitionsStefan problemvariational problemsfree boundariesGibbs-Thomson lawgeometric measure-theory
Stefan problems, phase changes, etc. (80A22) Free boundary problems for PDEs (35R35) Weak solutions to PDEs (35D30) PDEs in connection with classical thermodynamics and heat transfer (35Q79)
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Cites Work
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- Multiphase thermomechanics with interfacial structure. I: Heat conduction and the capillary balance law
- Compact sets in the space \(L^ p(0,T;B)\)
- The Stefan problem. Translated from the Russian by Marek Niezgódka and Anna Crowley
- Implicit time discretization for the mean curvature flow equation
- Anisotropic motion by mean curvature in the context of Finsler geometry
- Dynamics of labyrinthine pattern formation in magnetic fluids: A mean-field theory
- Solutions for the Stefan problem with Gibbs-Thomson law by a local minimisation
- Solutions for the two-phase Stefan problem with the Gibbs–Thomson Law for the melting temperature
- A multi-phase Mullins–Sekerka system: matched asymptotic expansions and an implicit time discretisation for the geometric evolution problem
- Lower semicontinuity of surface energies
- Discrete Anisotropic Curve Shortening Flow
- Existance uniqueness and regularity of classical solutions of the mullins—sekerka problem
- Classical Solutions of Multidimensional Hele--Shaw Models
- Analytic solutions for a Stefan problem with Gibbs-Thomson correction
- Curvature-Driven Flows: A Variational Approach
- The Wulff theorem revisited
- Existence of Weak Solutions for the Mullins--Sekerka Flow
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