摘要
数值积分是伽辽金无网格方法实施的一个重要环节,提出了一种适合于伽辽金无网格方法的单位分解积分技术· 该积分技术建立在有限覆盖和单位分解基础之上,不需要对积分区域进行分解,具有较高的积分精度· 并以无单元伽辽金方法为例,详细说明了基于单位分解积分的伽辽金无网格方法的实现过程· 这样,在近似函数建立和数值积分过程中都不需要进行网格划分,从而形成一种"真正的"
Numerical quadrature is an important ingredient of Galerkin meshless methods. A new numerical quadrature technique, partition of unity quadrature (PUQ), for Galerkin meshless methods was presented. The technique is based on finite covering and partition of unity.There is no need to decompose the physical domain into small cell. It possesses remarkable integration accuracy. Using Element-free Galerkin methods as example, Galerkin meshless methods based on PUQ were studied in detail. Meshing is always not required in the procedure of constitution of approximate function or numerical quadrature, so Galerkin meshless methods based on PUQ are “truly” meshless methods.
出处
《应用数学和力学》
EI
CSCD
北大核心
2005年第7期819-825,共7页
Applied Mathematics and Mechanics
基金
国家自然科学基金资助项目(10102020)
973国家基金资助项目(G1999032805)
关键词
伽辽金无网格方法
有限覆盖
单位分解
数值积分
Galerkin meshless method
finite cover
partition of unity
numerical quadrature