Convergence rate of the data-independent P-greedy algorithm in kernel-based approximation

IF 0.6 Q3 MATHEMATICS
G. Santin, B. Haasdonk
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引用次数: 58

Abstract

Kernel-based methods provide flexible and accurate algorithms for the reconstruction of functions from meshless samples. A major question in the use of such methods is the influence of the samples locations on the behavior of the approximation, and feasible optimal strategies are not known for general problems. Nevertheless, efficient and greedy point-selection strategies are known. This paper gives a proof of the convergence rate of the data-independent \textit{$P$-greedy} algorithm, based on the application of the convergence theory for greedy algorithms in reduced basis methods. The resulting rate of convergence is shown to be near-optimal in the case of kernels generating Sobolev spaces. As a consequence, this convergence rate proves that, for kernels of Sobolev spaces, the points selected by the algorithm are asymptotically uniformly distributed, as conjectured in the paper where the algorithm has been introduced.
核逼近中数据无关p -贪心算法的收敛速度
基于核的方法为从无网格样本中重建函数提供了灵活、准确的算法。使用这种方法的一个主要问题是样本位置对近似行为的影响,并且对于一般问题不知道可行的最优策略。然而,有效和贪婪的点选择策略是已知的。本文利用贪心算法的收敛理论在约基方法中的应用,证明了数据无关的\textit{$P$-贪心}算法的收敛速度。结果表明,在生成Sobolev空间的核的情况下,所得的收敛率是接近最优的。因此,这一收敛速度证明,对于Sobolev空间的核,算法所选取的点是渐近均匀分布的,这一点在介绍算法的文章中得到了推测。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.70
自引率
7.70%
发文量
0
审稿时长
8 weeks
期刊介绍: Dolomites Research Notes on Approximation is an open access journal that publishes peer-reviewed papers. It also publishes lecture notes and slides of the tutorials presented at the annual Dolomites Research Weeks and Workshops, which have been organized regularly since 2006 by the Padova-Verona Research Group on Constructive Approximation and Applications (CAA) in Alba di Canazei (Trento, Italy). The journal publishes, on invitation, survey papers and summaries of Ph.D. theses on approximation theory, algorithms, and applications.
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