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Media type:
E-Article
Title:
Freezing of a supercooled spherical droplet with mixed boundary conditions
Contributor:
Tabakova, Sonia;
Feuillebois, François;
Radev, Stefan
Published:
The Royal Society, 2010
Published in:
Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, 466 (2010) 2116, Seite 1117-1134
Language:
English
DOI:
10.1098/rspa.2009.0491
ISSN:
1364-5021;
1471-2946
Origination:
Footnote:
Description:
The freezing of a supercooled droplet occurs in two steps: recalescence, that is, a rapid return to thermodynamic equilibrium at the freezing temperature leading to a liquid–solid mixture and a longer stage of complete freezing. The second freezing step can be modelled by the one-phase Stefan problem for an inward solidification of a sphere, assuming the droplet to be spherical. A convective heat transfer with the ambient immiscible fluid is modelled by a mixed boundary condition on the outer surface of the droplet. This condition depends on the Biot number (ratio of the heat transfer resistances inside the droplet and at its surface). A novel asymptotic solution is developed for a small Stefan number and an arbitrary Biot number. Applying the method of matched asymptotic expansions, uniformly valid solutions are obtained for the temperature profile and freezing front evolution in the whole stage of complete freezing. For an infinite Biot number, that is, for a fixed temperature at the droplet outer boundary, known solutions are recovered. In parallel, numerical results are obtained for an arbitrary Stefan number using a finite-difference scheme based on the enthalpy method. The asymptotic and numerical solutions are in good agreement.