Moving meshes, conservation laws and least squares equidistributionBaines, M. J. (2002) Moving meshes, conservation laws and least squares equidistribution. International Journal of Numerical Methods for Fluids, 40 (1-2). pp. 3-19. ISSN 1097-0363 Full text not archived in this repository. It is advisable to refer to the publisher's version if you intend to cite from this work. See Guidance on citing. To link to this item DOI: 10.1002/fld.294 Abstract/SummaryIn this paper a least squares measure of a residual is minimized to move an unstructured triangular mesh into an optimal position, both for the solution of steady systems of conservation laws and for functional approximation. The result minimizes a least squares measure of an equidistribution norm, which is a norm measuring the uniformity of a fluctuation monitor. The minimization is carried out using a steepest descent approach. Shocks are treated using a mesh with degenerate triangles. Results are shown for a steady-scalar advection problem and two flows governed by the Euler equations of gasdynamics.
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