两相圆柱形Stefan凝固问题的相似解

IF 0.2 Q4 MATHEMATICS
T. Nauryz
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引用次数: 0

摘要

建立了凝固过程中柱面温度场确定的数学模型。采用两相圆柱形Stefan问题,构建了具有冻结界面的液固两区圆柱体冷却凝固过程。对散热器的圆柱的中心物质边界条件1 0 0 lim [2] r r r温度是一个重要的决定在固体域。用相似原理的方法给出了该问题的解析解,使我们能够将自由边界问题化为常微分方程。固体和液体区域的温度解用指数积分方程表示。确定了冻结界面的自由边界和两相温度。引入指数积分函数的引理,并利用引理证明所得到的算子函数是收缩算子。用图形法检验了指数积分函数的上界。证明了解的唯一性的存在性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Similarity solution of two-phase cylindrical Stefan solidification problem
The mathematical model of determining temperature fields in cylindrical domain with solidification process is represented. The solidification process of cylinder due to cooling is constructed by two-phase cylindrical Stefan problem for liquid and solid zones with freezing interface. Respect to strength of the heat sink at the center of cylindrical material boundary condition 1 0 0 lim[2 ] r r r         is an important to determine temperature in solid domain. The analytical solution of the problem is introduced with method of similarity principle which enables us to reduce free boundary problem to ordinary differential equations. Temperature solutions of solid and liquid zones are represented by special function which called exponential integral equation. The free boundary at freezing interface and temperatures at two phases are determined. Lemmas about exponential integral functions are introduced and used to prove that obtained operator function is contraction operator. Upper boundness of the exponential integral function is checked graphically. It is shown that existence of uniqueness of solution exists.
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CiteScore
0.30
自引率
0.00%
发文量
11
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