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宽边界法参数分析以及基于双宽边界法的插值方法
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Abstract:
有限元法在学术界和工程界都取得了巨大的成功,然而有限元法也存在一些问题。例如,为了避免网格畸变,需要花费大量的时间进行有限元计算的前处理。目前已经开发了一些不匹配网格方法来解决这个问题。近年来,宽边界法(Fat Boundary Method)被提出并应用于弹性力学领域,而双宽边界法(Dual Fat Boundary Method)是宽边界法的一种改进。这些方法都需要通过迭代法进行求解。本文研究了宽边界法与迭代相关的算法参数对迭代的影响,并提出了一种基于双宽边界法的插值方法,以降低计算成本。
Finite Element Method (FEM) has achieved a great success both in the field of academic and engi-neering. However, there are some problems for FEM. For example, the mesh generation procedure consumes a lot of time for an engineering problem to avoid mesh distortion. Some fictitious domain methods have been developed to tackle this problem. Recently, the Fat Boundary Method (FBM) has been proposed and applied to elasticity and as an improvement of FBM, the Dual Fat Boundary Method (DFBM) is proposed. These methods need an iteration procedure. In this article, the algorithmic parameters related to the iteration of FBM are studied and an interpolation method based on DFBM is proposed to reduce computational costs.
| [1] | Yagawa, G. (2011) Free Mesh Method: Fundamental Conception, Algorithms and Accuracy Study. Proceedings of the Japan Academy, Series B: Physical and Biological Sciences, 87, 115-134. https://doi.org/10.2183/pjab.87.115 |
| [2] | Schillinger, D. and Ruess, M. (2015) The Finite Cell Method: A Review in the Context of Higher-Order Structural Analysis of CAD and Image-Based Geometric Models. Archives of Compu-tational Methods in Engineering, 22, 391-455. https://doi.org/10.1007/s11831-014-9115-y |
| [3] | Cottrell, J.A., Hughes, T.J.R. and Bazilevs, Y. (2009) Isogeometric Analysis: Toward Integration of CAD and FEA. Wiley, Chichester. https://doi.org/10.1002/9780470749081 |
| [4] | Maury, B.A. (2001) Fat Boundary Method for the Poisson Problem in a Domain with Holes. Journal of Scientific Computing, 16, 319-339. https://doi.org/10.1023/A:1012821728631 |
| [5] | Ismail, M. (2004) The Fat Boundary Method for the Numerical Resolution of Elliptic Problems in Perforated Domains. Application to 3D Fluid Flows. PhD Thesis, Universite Pierre et Marie Curie, Paris VI, France. |
| [6] | Vos, P.E.J., van Loon, R. and Sherwin, S.J. (2008) A Comparison of Fictitious Domain Methods Appropriate for Spectral/hp Element Discretisations. Computer Methods in Applied Mechanics and Engineering, 197, 2275-2289.
https://doi.org/10.1016/j.cma.2007.11.023 |
| [7] | de Boer, A., van Zuijlen, A.H. and Bijl, H. (2007) Review of Coupling Methods for Non-Matching Meshes. Computer Methods in Applied Mechanics and Engineering, 196, 1515-1525. https://doi.org/10.1016/j.cma.2006.03.017 |
| [8] | Liu, K., Zhao, A. and Hu, Z. (2020) Dual Fat Boundary Method: The Fat Boundary Method in Elasticity with an Extension of the Application Scope. Mathematics and Mechanics of Solids, 26, No. 3.
https://doi.org/10.1177/1081286520964499 |
| [9] | Bertoluzza, S., Ismail, M. and Maury, B. (2011) Analysis of the Fully Discrete Fat Boundary Method. Numerical Mathematics, 18, 49-77. https://doi.org/10.1007/s00211-010-0317-4 |
| [10] | Muskhelishvili, N.I. (1977) Some Basic Problems of the Math-ematical Theory of Elasticity. 2nd Ed., Springer, Dordrecht. https://doi.org/10.1007/978-94-017-3034-1 |
