Title of article
Hyperbolic conservation laws on the sphere. A geometry-compatible finite volume scheme
Author/Authors
Ben-Artzi، نويسنده , , Matania and Falcovitz، نويسنده , , Joseph and LeFloch، نويسنده , , Philippe G.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
19
From page
5650
To page
5668
Abstract
We consider entropy solutions to the initial value problem associated with scalar nonlinear hyperbolic conservation laws posed on the two-dimensional sphere. We propose a finite volume scheme which relies on a web-like mesh made of segments of longitude and latitude lines. The structure of the mesh allows for a discrete version of a natural geometric compatibility condition, which arose earlier in the well-posedness theory established by Ben-Artzi and LeFloch. We study here several classes of flux vectors which define the conservation law under consideration. They are based on prescribing a suitable vector field in the Euclidean three-dimensional space and then suitably projecting it on the sphere’s tangent plane; even when the flux vector in the ambient space is constant, the corresponding flux vector is a non-trivial vector field on the sphere. In particular, we construct here “equatorial periodic solutions”, analogous to one-dimensional periodic solutions to one-dimensional conservation laws, as well as a wide variety of stationary (steady state) solutions. We also construct “confined solutions”, which are time-dependent solutions supported in an arbitrarily specified subdomain of the sphere. Finally, representative numerical examples and test cases are presented.
Keywords
sphere , hyperbolic conservation law , Geometry-compatible flux , Finite volume scheme , Entropy solution
Journal title
Journal of Computational Physics
Serial Year
2009
Journal title
Journal of Computational Physics
Record number
1481649
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