A practical framework for the construction of prolongation operators for multigrid based on canonical basis functions

Roman W, Köstler H (2010)


Publication Type: Journal article

Publication year: 2010

Journal

Publisher: Springer Verlag

Book Volume: 13

Pages Range: 207-220

Journal Issue: 8

URI: http://www.springerlink.com/content/cm30372356013201/

DOI: 10.1007/s00791-010-0138-0

Abstract

We discuss a general framework for the construction of prolongation operators for multigrid methods. It turns out that classical black-box prolongation or prolongation operators based on smoothed aggregation can be classified as special cases. The approach is suitable both for geometric and for purely algebraic multigrid settings. It allows for a simple and efficient implementation and parallelization by introducing canonical basis functions. We show numerical results for several diffusion problems with strongly varying or jumping coefficients. As one possible application for our method we choose three-dimensional medical image segmentation. In addition to that a nonsymmetric convection-diffusion problem is presented. © 2010 Springer-Verlag.

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APA:

Roman, W., & Köstler, H. (2010). A practical framework for the construction of prolongation operators for multigrid based on canonical basis functions. Computing and Visualization in Science, 13(8), 207-220. https://dx.doi.org/10.1007/s00791-010-0138-0

MLA:

Roman, Wienands, and Harald Köstler. "A practical framework for the construction of prolongation operators for multigrid based on canonical basis functions." Computing and Visualization in Science 13.8 (2010): 207-220.

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