Ken'ichiro Tanaka
Published 2018-10-19Version 1
We propose algorithms to take point sets for kernel-based interpolation of functions in reproducing kernel Hilbert spaces (RKHSs) by convex optimization. We consider the case of kernels with the Mercer expansion and propose an algorithm by deriving a second-order cone programming (SOCP) problem that yields $n$ points at one sitting for a given integer $n$. In addition, by modifying the SOCP problem slightly, we propose another sequential algorithm that adds an arbitrary number of new points in each step. Numerical experiments show that in several cases the proposed algorithms compete with the $P$-greedy algorithm, which is known to provide nearly optimal points.
Comments: 30 pages. The programs for the numerical computation in this article are available on https://github.com/KeTanakaN/mat_points_interp_rkhs
On node distributions for interpolation and spectral methods
Biorthogonal greedy algorithms in convex optimization
Almost-sure quasi-optimal approximation in reproducing kernel Hilbert spaces
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