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Solidification of a ternary melt from a cooled boundary, or nonlinear dynamics of mushy layers

✍ Scribed by D.V. Alexandrov; A.A. Ivanov

Publisher: Elsevier Science
Year: 2009
Tongue: English
Weight: 435 KB
Volume: 52
Category: Article
ISSN: 0017-9310
DOI: 10.1016/j.ijheatmasstransfer.2009.05.029

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✦ Synopsis

We present a mathematical model and its analytical solution describing directional solidification of a ternary (three-component) system cooled from below. We focus on the solidification theory in the presence of two distinct mushy layers: (1) solidification along a liquidus surface is characterized by a primary mushy layer, and (2) solidification along a cotectic line is characterized by a secondary (cotectic) mushy layer. We consider the case when the phase transition temperatures in two mushy layers represent arbitrary functions of the compositions. We obtain an exact analytical solution of the nonlinear set of equations and boundary conditions in the case of a self-similar solidification scenario. Model predictions are in good agreement with existing experimental data.

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The nonlinear dynamics of solidification of a binary melt with a nonequilibrium mushy region

✍ Valery V. Mansurov 📂 Article 📅 1990 🏛 Elsevier Science 🌐 English ⚖ 264 KB

A new theoretical analysis of the solidification process of a binarymelt with a mushy region, in which the temperature is below the equilibrium temperature, is presented. The mushy region consists of the liquid and the growing spherical particles. The equations of heat and mass of the solute and the