Mahir Hadžić, Steve Shkoller
Published 2012-12-06, updated 2013-10-20Version 4
The classical one-phase Stefan problem describes the temperature distribution in a homogeneous medium undergoing a phase transition, such as ice melting to water. This is accomplished by solving the heat equation on a time-dependent domain whose boundary is transported by the normal derivative of the temperature along the evolving and a priori unknown free-boundary. We establish a global-in-time stability result for nearly spherical geometries and small temperatures, using a novel hybrid methodology, which combines energy estimates, decay estimates, and Hopf-type inequalities.
Comments: 50 pages, references added, minor typos corrected, to appear in Comm. Pure Appl. Math, abstract added for UK REF
Global stability of steady states in the classical Stefan problem
Two different fractional Stefan problems which are convergent to the same classical Stefan problem
Global stability of a partial differential equation with distributed delay due to cellular replication
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