Abstract
The streamline upwind technique is extended to quadratic dements to analyze incompressible and viscous flow equations cast in the steady state. The biased part of the weighting Junctions is devised to achieve a nodally exact discretized one-dimensional equation, with an emphasis on grid nonuniformity. Two classes of upwinding finite-element models are considered. Our primary goal is to address the deficiency of the partially weighted finite-element model. Assessment is made of the stability and accuracy of the schemes devised. The integrity of the weighting functions chosen and the finite-element models considered is demonstrated analytically, and their performance is assessed systematically.
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