• 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