学位论文详细信息
Two-Dimensional Anisotropic Cartesian Mesh Adaptation for the Compressible Euler Equations
Mechanical Engineering;compressible flow;shock waves;mesh adaptation;Cartesian;euler equations;refinement criterion
Keats, William A.
University of Waterloo
关键词: Mechanical Engineering;    compressible flow;    shock waves;    mesh adaptation;    Cartesian;    euler equations;    refinement criterion;   
Others  :  https://uwspace.uwaterloo.ca/bitstream/10012/948/1/wakeats2004.pdf
瑞士|英语
来源: UWSPACE Waterloo Institutional Repository
PDF
【 摘 要 】

Simulating transient compressible flows involving shock waves presentschallenges to the CFD practitioner in terms of the mesh quality required toresolve discontinuities and prevent smearing.This document discusses a novel two-dimensional Cartesian anisotropic mesh adaptation technique implemented for transient compressible flow.This technique, originally developed for laminar incompressible flow, is efficient because it refines and coarsens cells using criteria that consider the solution in each of the cardinal directions separately.In this document the method will be applied to compressible flow.The procedure shows promise in its ability to deliver good quality solutions while achieving computational savings. Transient shock wave diffraction over a backward step and shock reflection over a forward step are considered as test cases because they demonstrate that the quality of the solution can be maintained as the mesh is refined and coarsened in time.The data structure is explained in relation to the computational mesh, and the object-oriented design and implementation of the code is presented.Refinement and coarsening algorithms are outlined.Computational savings over uniform and isotropic mesh approaches are shown to be significant.

【 预 览 】
附件列表
Files Size Format View
Two-Dimensional Anisotropic Cartesian Mesh Adaptation for the Compressible Euler Equations 4974KB PDF download
  文献评价指标  
  下载次数:43次 浏览次数:48次