Title :
Variational Harmonic Method for Parameterization of Computational Domain in 2D Isogeometric Analysis
Author :
Xu, Gang ; Mourrain, Bernard ; Duvigneau, Régis ; Galligo, André
Author_Institution :
Coll. of Comput., Hangzhou Dianzi Univ., Hangzhou, China
Abstract :
In isogeometric anlaysis, parameterization of computational domain has great effects as mesh generation in finite element analysis. In this paper, based on the concept of harmonic map from the computational domain to parametric domain, a variational approach is proposed to construct the parameterization of computational domain for 2D isogeometric analysis. Different from the previous elliptic mesh generation method in finite element analysis, the proposed method focus on isogeometric version, and converts the elliptic PDE into a nonlinear optimization problem. A regular term is integrated into the optimization formulation to achieve more uniform grid near convex(concave) parts of the boundary. Several examples are presented to show the efficiency of the proposed method.
Keywords :
CAD; computational geometry; finite element analysis; nonlinear programming; partial differential equations; variational techniques; 2D isogeometric analysis; CAD; computational domain parameterization; elliptic PDE; elliptic mesh generation; finite element analysis; harmonic map; nonlinear optimization; parametric domain; variational harmonic method; Computational modeling; Design automation; Harmonic analysis; Heating; Mesh generation; Optimization; Spline;
Conference_Titel :
Computer-Aided Design and Computer Graphics (CAD/Graphics), 2011 12th International Conference on
Conference_Location :
Jinan
Print_ISBN :
978-1-4577-1079-7
DOI :
10.1109/CAD/Graphics.2011.22
