Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
8953890 | Journal of Computational Physics | 2018 | 23 Pages |
Abstract
We introduce an efficient algorithm, called partition of unity extension or PUX, to construct an extension of desired regularity of a function given on a complex multiply connected domain in 2D. Function extension plays a fundamental role in extending the applicability of boundary integral methods to inhomogeneous partial differential equations with embedded domain techniques. Overlapping partitions are placed along the boundaries, and a local extension of the function is computed on each patch using smooth radial basis functions; a trivially parallel process. A partition of unity method blends the local extrapolations into a global one, where weight functions impose compact support. The regularity of the extended function can be controlled by the construction of the partition of unity function. We evaluate the performance of the PUX method in the context of solving the Poisson equation on multiply connected domains using a boundary integral method and a spectral solver. With a suitable choice of parameters the error converges as a tenth order method down to 10â14.
Related Topics
Physical Sciences and Engineering
Computer Science
Computer Science Applications
Authors
Fredrik Fryklund, Erik Lehto, Anna-Karin Tornberg,