dc.contributor.author Wiwatanapataphee, B. dc.contributor.author Mookum, T. dc.contributor.author Wu, Yong Hong dc.date.accessioned 2017-01-30T13:17:14Z dc.date.available 2017-01-30T13:17:14Z dc.date.created 2012-03-25T20:01:24Z dc.date.issued 2011 dc.identifier.citation Wiwatanapataphee, Benchawan and Mookum, Theeradech and Wu, Yong Hong. 2011. Numerical simulation of two-fluid flow and meniscus interface movement in the electromagnetic continuous steel casting process. Discrete and Continuous Dynamical Systems Series B. 16 (4): pp. 1171-1183. dc.identifier.uri http://hdl.handle.net/20.500.11937/30063 dc.identifier.doi 10.3934/dcdsb.2011.16.1171 dc.description.abstract This paper presents a mathematical model and numerical technique for simulating the two-fluid flow and the meniscus interface movement in the electromagnetic continuous steel casting process. The governing equationsinclude the continuity equation, the momentum equations, the energy equation, the level set equation and two transport equations for the electromagnetic field derived from the Maxwell’s equations. The level set finite element method is applied to trace the movement of the interface between different fluids. In an attempt to optimize the casting process, the technique is then applied to study the influences of the imposed electromagnetic field and the mould oscillation pattern on the fluid flow, the meniscus shape and temperature distribution. dc.publisher American Institute of Mathematical Sciences dc.subject meniscus shape dc.subject Electromagnetic caster dc.subject finite element method dc.subject level set method dc.subject continuous steel casting process dc.subject two-fluid flow dc.title Numerical simulation of two-fluid flow and meniscus interface movement in the electromagnetic continuous steel casting process dc.type Journal Article dcterms.source.volume 16 dcterms.source.number 4 dcterms.source.startPage 1171 dcterms.source.endPage 1183 dcterms.source.issn 15313492 dcterms.source.title Discrete and Continuous Dynamical Systems Series B curtin.department Department of Mathematics and Statistics curtin.accessStatus Open access via publisher
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