Improved stability estimates and a characterization of the native space for matrix-valued RBFs |
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Authors: | Edward J. Fuselier |
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Affiliation: | (1) Department of Mathematical Sciences, United States Military Academy, West Point, NY 10996, USA |
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Abstract: | In this paper we derive several new results involving matrix-valued radial basis functions (RBFs). We begin by introducing a class of matrix-valued RBFs which can be used to construct interpolants that are curl-free. Next, we offer a characterization of the native space for divergence-free and curl-free kernels based on the Fourier transform. Finally, we investigate the stability of the interpolation matrix for both the divergence-free and curl-free cases, and when the kernel has finite smoothness we obtain sharp estimates. An erratum to this article can be found at |
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Keywords: | Divergence-free Radial basis functions Stability Native spaces Interpolation |
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