Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting

Narcowich FJ; Ward JD; Wendland H

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Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting

机译：带零点的函数的Sobolev边界，适用于径向基函数曲面拟合

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In this paper we discuss Sobolev bounds on functions that vanish at scattered points in a bounded, Lipschitz domain that satisfies a uniform interior cone condition. The Sobolev spaces involved may have fractional as well as integer order. We then apply these results to obtain estimates for continuous and discrete least squares surface fits via radial basis functions (RBFs). These estimates include situations in which the target function does not belong to the native space of the RBF.

机译：在本文中，我们讨论函数的Sobolev边界在满足均匀内部圆锥条件的有界Lipschitz域中的分散点处消失。所涉及的Sobolev空间可以具有分数阶和整数阶。然后，我们将这些结果应用于通过径向基函数（RBF）获得的连续和离散最小二乘曲面拟合的估计值。这些估计包括目标函数不属于RBF的本机空间的情况。

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《Mathematics of computation》 |2005年第250期|共21页
作者
Narcowich FJ; Ward JD; Wendland H;
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正文语种 eng
中图分类数学;
关键词
radial basis functions; Sobolev error estimates; scattered zeros; scattered data; POSITIVE DEFINITE FUNCTIONS; MULTIVARIATE INTERPOLATION; APPROXIMATION; SPLINES; ERROR;

机译：径向基函数;Sobolev误差估计;零散;零散数据;正定函数;多元插值;逼近;样条;误差;

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1. Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting [J] . Narcowich FJ, Ward JD, Wendland H Mathematics of computation . 2005,第250期

机译：带零点的函数的Sobolev边界，适用于径向基函数曲面拟合
2. Large Scattered Data Fitting Based on Radial Basis Functions [J] . FENG, Ren-zhong, XU, 计算机辅助绘图．设计与制造：英文版 . 2007,第001期

机译：基于径向基函数的大分散数据拟合
3. Improved error bounds for scattered data interpolation by radial basis functions [J] . R. Schaback Mathematics of computation . 1999,第225期

机译：通过径向基函数改进了散乱数据插值的误差范围
4. Interpolating implicit surfaces from scattered surface data using compactly supported radial basis functions [C] . Morse, B.S., Yoo, . 2001

机译：使用紧密支持的径向基函数从分散的曲面数据中插入隐含曲面
5. Radial basis functions: Biomedical applications and parallelization. [D] . Liu, Ke. 2016

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6. Separation and Determination of Honokiol and Magnolol in Chinese Traditional Medicines by Capillary Electrophoresis with the Application of Response Surface Methodology and Radial Basis Function Neural Network [O] . Ping Han, Feng Luan, Xizu Yan, -1

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7. Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting [O] . Francis J. Narcowich, Joseph D. Ward, Holger Wendland 2004

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8. Surface-Fitting and Analysis of Scattered Data via Radial and Related Basis Functions with Applications to Neural Networks [R] . Narcowich, F. J. 2001

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Sobolev bounds on functions with scattered zeros, with applications to radial basis function surface fitting

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