A parallel adaptive numerical method with generalized curvilinear coordinate transformation for compressible Navier–Stokes equations |
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Authors: | X Gao L D Owen S M J Guzik |
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Affiliation: | Computational Fluid Dynamics and Propulsion Laboratory, Department of Mechanical Engineering, Colorado State University, Fort Collins, CO, USA |
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Abstract: | A fourth‐order finite‐volume method for solving the Navier–Stokes equations on a mapped grid with adaptive mesh refinement is proposed, implemented, and demonstrated for the prediction of unsteady compressible viscous flows. The method employs fourth‐order quadrature rules for evaluating face‐averaged fluxes. Our approach is freestream preserving, guaranteed by the way of computing the averages of the metric terms on the faces of cells. The standard Runge–Kutta marching method is used for time discretization. Solutions of a smooth flow are obtained in order to verify that the method is formally fourth‐order accurate when applying the nonlinear viscous operators on mapped grids. Solutions of a shock tube problem are obtained to demonstrate the effectiveness of adaptive mesh refinement in resolving discontinuities. A Mach reflection problem is solved to demonstrate the mapped algorithm on a non‐rectangular physical domain. The simulation is compared against experimental results. Future work will consider mapped multiblock grids for practical engineering geometries. Copyright © 2016 John Wiley & Sons, Ltd. |
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Keywords: | generalized curvilinear coordinate transformation fourth‐order finite‐volume method compressible Navier– Stokes algorithm mapped grids finite‐volume Method on mapped grids adaptive mesh refinement for mapped grids |
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