1. A numerical study on Neumann-Neumann methods forhpapproximations on geometrically refined boundary layer meshes II. Three-dimensional problems
- Author
-
Andrea Toselli and Xavier Vasseur
- Subjects
Numerical Analysis ,Numerical linear algebra ,Applied Mathematics ,Numerical analysis ,Mathematical analysis ,Domain decomposition methods ,computer.software_genre ,Finite element method ,Computational Mathematics ,Neumann–Neumann methods ,Modeling and Simulation ,Degree of a polynomial ,Algebraic number ,computer ,Condition number ,Analysis ,Mathematics - Abstract
In this paper, we present extensive numerical tests showing the performance and robustness of a Balancing Neumann-Neumann method for the solution of algebraic linear systems arising from hp finite element approximations of scalar elliptic problems on geometrically refined boundary layer meshes in three dimensions. The numerical results are in good agreement with the theoretical bound for the condition number of the preconditioned operator derived in [Toselli and Vasseur, IMA J. Numer. Anal. 24 (2004) 123–156]. They confirm that the condition numbers are independent of the aspect ratio of the mesh and of potentially large jumps of the coefficients. Good results are also obtained for certain singularly perturbed problems. The condition numbers only grow polylogarithmically with the polynomial degree, as in the case of p approximations on shape-regular meshes [Pavarino, RAIRO: Model. Math. Anal. Numer. 31 (1997) 471–493]. This paper follows [Toselli and Vasseur, Comput. Methods Appl. Mech. Engrg. 192 (2003) 4551–4579] on two dimensional problems.
- Published
- 2006
- Full Text
- View/download PDF