• Title of article

    Difference schemes on uniform grids performed by general discrete operators Original Research Article

  • Author/Authors

    Enrique Bendito، نويسنده , , ?ngeles Carmona، نويسنده , , Andrés M Encinas، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2004
  • Pages
    28
  • From page
    343
  • To page
    370
  • Abstract
    Our aim is to set the foundations of a discrete vectorial calculus on uniform n-dimensional grids, that can be easily reformulated on general irregular grids. As a key tool we first introduce the notion of tangent space to any grid node. Then we define the concepts of vector field, field of matrices and inner products on the space of grid functions and on the space of vector fields, mimicking the continuous setting. This allows us to obtain the discrete analogous of the basic first order differential operators, gradient and divergence, whose composition define the fundamental second order difference operator. As an application, we show that all difference schemes, with constant coefficients, for first and second order differential operators with constant coefficients can be seen as difference operators of the form View the MathML source for suitable choices of q, View the MathML source and View the MathML source. In addition, we characterize special properties of the difference scheme, such as consistency, symmetry and positivity in terms of q, View the MathML source and View the MathML source.
  • Journal title
    Applied Numerical Mathematics
  • Serial Year
    2004
  • Journal title
    Applied Numerical Mathematics
  • Record number

    942352