Finite volume methods for solving hyperbolic problems on euclidean manifolds without radially symmetric initial condition

dc.contributor.authorRahaman, Moshiour
dc.contributor.authorAzim, Nur Hossain Md. Ariful
dc.date.accessioned2010-10-19T07:56:02Z
dc.date.available2010-10-19T07:56:02Z
dc.date.issued2006
dc.description.abstractMany interesting physical systems are successfully modeled with time-dependant conservation laws on smooth manifolds, M. Examples of such systems include hydrodynamic flows in non-trivial geometry, important in aerodynamic modeling. Though in many applications the manifold is simply Euclidean space;M = ∇3, the curvilinear basis on which computes is non-orthogonal and quite complicated. The finite volume methods have very important property of ensuring that basic quantities such as mass, momentum and energy are conserved at a discrete level. Conservation is satisfied over each control volume, over a group of control volumes and over the entire solutiondomain. The finite volume methods are used to solve conservation laws on Euclidean manifold.
dc.identifier.otherhttps://dspace.bracu.ac.bd/server/api/core/items/cb216b48-b100-4eb7-b171-076a3184798c
dc.identifier.urihttp://hdl.handle.net/10361/572
dc.language.isoen
dc.publisherBRAC University
dc.sourceBRAC University Institutional Repository
dc.subjectFinite volume
dc.subjectConservation
dc.subjectManifold
dc.subjectFlux
dc.subjectWave equations
dc.titleFinite volume methods for solving hyperbolic problems on euclidean manifolds without radially symmetric initial condition
dc.typeArticle

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