Title of article
Symmetry-preserving upwind discretization of convection on non-uniform grids Original Research Article
Author/Authors
Arthur E.P. Veldman، نويسنده , , Ka-Wing Lam، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
11
From page
1881
To page
1891
Abstract
Although upwind discretization of convection will lead to a diagonally dominant coefficient matrix, on arbitrary grids the latter is not necessarily positive real, i.e. its symmetric part need not be positive definite (‘negative diffusion’). Especially on contracting-expanding grids this property can be lost. The paper discusses a conservative (finite-volume) upwind variant for which the latter property is guaranteed to hold, irrespective of grid (ir)regularity. Further, empirically it is found that often its global discretization error is smaller than that of the ‘traditional’ (finite-difference) upwind method. Finally, it is shown that in many situations its extremal eigenvalues at the outer side of the spectrum move towards the imaginary axis, thus enhancing the stability of explicit time-integration methods.
Journal title
Applied Numerical Mathematics
Serial Year
2008
Journal title
Applied Numerical Mathematics
Record number
942877
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