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タイトル
和文: 
英文:Time-domain isogeometric boundary element method based on the convolution quadrature method for scalar wave propagation 
著者
和文: Tsukasa Ito, 斎藤 隆泰, BUI TINH QUOC, 廣瀬 壮一.  
英文: Tsukasa Ito, Takahiro Saitoh, Tinh Quoc Bui, Sohichi Hirose.  
言語 English 
掲載誌/書名
和文: 
英文: 
巻, 号, ページ        
出版年月 2017年7月 
出版者
和文: 
英文: 
会議名称
和文: 
英文:The 8th International Conference on Computational Methods (ICCM2017) 
開催地
和文: 
英文:Guilin 
公式リンク http://www.sci-en-tech.com/ICCM/index.php/iccm2017/2017/paper/view/2748
 
アブストラクト This paper presents a time-domain isogeometric boundary element method based on the convolution quadrature method (CQM) for scalar wave propagation. The concept of isogeometric analysis, first proposed by Hughes et al, for approximating the unknown fields in a numerical discretization with the parametric functions called Non-Uniform Rational B-spline (NURBS) that are used to describe CAD geometry, has received attention in recent years. Application of the isogeometric analysis to the Finite Element Method (FEM) has been done by several researchers [Hughes et al. (2009); Bui et al. (2016)]. The main advantage of the isogeometric FEM is not necessary to generate FEM geometry mesh. Therefore, the isogeometric FEM can produce high precision solutions due to the direct use of CAD geometry of the analysis model. However, FEM based-numerical methods cannot deal with wave propagation problems in infinite domains without any modifications such as PML and other non-reflecting boundaries [Givoli. (2004)]. Therefore, in this research, time-domain isogeometric boundary element method based on the convolution quadrature method (CQ-IGBEM) is developed for wave propagation problems in infinite domains. In general, the boundary element method is known as a suitable numerical approach, and is able to treat full and half-spaces without difficulties. In the conference, the formulation of our proposed CQ-IGBEM for scalar wave propagation is presented. As numerical examples, the problems of scalar wave scattering by arbitrary objects are solved to validate the proposed method.

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