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Fast Multipole BEM for Simulation of 2-D Solids Containing Large Numbers of Cracks

Pengbo WANGZhenhan YAO( )Haitao WANG
Department of Engineering Mechanics, Tsinghua University, Beijing 100084, China
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Abstract

The fast multipole method was used to solve the traction boundary integral equation for 2-D crack analysis. The use of both multipole and local expansions reduces both the computational complexity and the memory requirement to O(N). The multipole expansion uses a complex Taylor series expansion to reduce the number of multipole moments. The generalized minimum residual method solver (GMRES) was selected as the iterative solver. An improved preconditioner for GMRES was developed which uses less CPU time and less memory. A new initial candidate vector for the iterative solver was developed to further improve the efficiency. The numerical examples apply the method to the analysis of cracks in infinite 2-D space with the largest model having 900000 degrees of freedom.

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Tsinghua Science and Technology
Pages 76-81

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Cite this article:
WANG P, YAO Z, WANG H. Fast Multipole BEM for Simulation of 2-D Solids Containing Large Numbers of Cracks. Tsinghua Science and Technology, 2005, 10(1): 76-81. https://doi.org/10.1016/S1007-0214(05)70012-2

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Received: 16 August 2004
Revised: 30 August 2004
Published: 01 February 2005
© Tsinghua University Press 2005