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Article information
2008 , Volume 13, Special issue, p.47-53
Kalinkin A.A.
Non-conformal finite elements in 3D problems of elastic theory
In this article, we propose nonconformal finite elements of the Crouise---Raviart type for a 3D elasticity problem on a parallelipedal grid. We also propose a two-step iterative method for solution of the corresponding grid problem. We construct a preconditioner based on a transition from the elasticity operator to the grid Laplace operator as well as on a diagonalisation of the tangent displacement matrix and internal Chebyshev's iterations for the normal displacements. Theoretical and experimental analysis of the method is performed.
[full text]
Keywords: Elliptic equation, boundary-value problem, Green function, random walk inside the domain, gradient
Author(s):
Kalinkin A.A.
Address: Russia, Novosibirsk
E-mail: alexander.a.kalinkin@intel.com
Bibliography link:
Kalinkin A.A. Non-conformal finite elements in 3D problems of elastic theory // Computational technologies. 2008. V. 13. Special issue 4. P. 47-53
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