Abstract
This article is concerned with a new analytical description of nucleation and growth of crystals in a metastable mushy layer (supercooled liquid or supersaturated solution) at the intermediate stage of phase transition. The model under consideration consisting of the non-stationary integro-differential system of governing equations for the distribution function and metastability level is analytically solved by means of the saddle-point technique for the Laplace-type integral in the case of arbitrary nucleation kinetics and time-dependent heat or mass sources in the balance equation. We demonstrate that the time-dependent distribution function approaches the stationary profile in course of time.
This article is part of the theme issue ‘From atomistic interfaces to dendritic patterns’.
Funder
Russian Foundation for Basic Research
Subject
General Physics and Astronomy,General Engineering,General Mathematics
Cited by
67 articles.
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