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Title: Approximation of a nonlinear thermoelastic problem with a moving boundary via a fixed-domain method (English)
Author: Nečas, Jindřich
Author: Roubíček, Tomáš
Language: English
Journal: Aplikace matematiky
ISSN: 0373-6725
Volume: 35
Issue: 5
Year: 1990
Pages: 361-372
Summary lang: English
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Category: math
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Summary: The thermoelastic stresses created in a solid phase domain in the course of solidification of a molten ingot are investigated. A nonlinear behaviour of the solid phase is admitted, too. This problem, obtained from a real situation by many simplifications, contains a moving boundary between the solid and the liquid phase domains. To make the usage of standard numerical packages possible, we propose here a fixed-domain approximation by means of including the liquid phase domain into the problem (in this way we get the fixed domain involving the whole ingot) and by replacing the liquid phase with a solid phase having, however, a small shear modulus. The weak $L^2$-convergence of thus approximated stresses in the solid phase domain is demonstrated. Besides, this convergence is shown to be strong on subsets whose closure belongs to the solid phase domain. (English)
Keyword: nonlinear thermoelasticity
Keyword: solidification
Keyword: moving boundary
MSC: 35B45
MSC: 35J70
MSC: 35R35
MSC: 65P05
MSC: 73B30
MSC: 73C50
MSC: 74A15
MSC: 74B20
MSC: 74P10
MSC: 74S30
idZBL: Zbl 0717.73096
idMR: MR1072607
DOI: 10.21136/AM.1990.104418
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Date available: 2008-05-20T18:39:50Z
Last updated: 2020-07-28
Stable URL: http://hdl.handle.net/10338.dmlcz/104418
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Reference: [1] J. Nečas I. Hlaváček: Mathematical Theory of Elastic and Elasto-Plastic Bodies: An introduction.Elsevier, Amsterdam, 1981. MR 0600655
Reference: [2] J. Nečas: Introduction to the Theory of Nonlinear Elliptic Equations.Teubner, Leipzig, 1983. MR 0731261
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