单变量分段光滑函数估计的柔性、边界自适应非参数方法

IF 11 Q1 STATISTICS & PROBABILITY
U. Amato, A. Antoniadis, I. Feis
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引用次数: 1

摘要

我们提出并比较了一些非参数估计方法(小波和/或基于样条的),旨在恢复一维分段平滑回归函数,在固定等距或非等距设计回归模型和随机设计模型中。由于函数在时间和频率上的同时定位特性,小波方法在去噪和压缩方面具有很强的竞争力。然而,边界假设,如周期性或对称性,会产生偏差和人为波动,从而降低整体精度。在文献中已经提出了一些简单的方法来减少边界上的偏差。我们引入了基于两个估计量自适应组合的新估计量。其基本思想是将高度精确的非正则函数方法(如小波)与在边界处表现良好的方法(如样条或局部多项式)相结合。我们给出了一些支持我们方法的渐近最优结果。所有的方法都可以处理随机设计的数据。我们还概述了对多维设置的一些概括。我们对所提出的方法的性能进行了大量的综合数据模拟。对使用这些过程的两个实际数据应用程序进行了有趣的回归分析,明确地证明了它们的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Flexible, boundary adapted, nonparametric methods for the estimation of univariate piecewise-smooth functions
: We present and compare some nonparametric estimation meth- ods (wavelet and/or spline-based) designed to recover a one-dimensional piecewise-smooth regression function in both a fixed equidistant or not equidistant design regression model and a random design model. Wavelet methods are known to be very competitive in terms of denois- ing and compression, due to the simultaneous localization property of a function in time and frequency. However, boundary assumptions, such as periodicity or symmetry, generate bias and artificial wiggles which degrade overall accuracy. Simple methods have been proposed in the literature for reducing the bias at the boundaries. We introduce new ones based on adaptive combinations of two estimators. The underlying idea is to combine a highly accurate method for non-regular functions, e.g., wavelets, with one well behaved at boundaries, e.g., Splines or Local Polynomial. We provide some asymptotic optimal results supporting our approach. All the methods can handle data with a random design. We also sketch some generalization to the multidimensional setting. the performance of the proposed approaches we have an extensive set of simulations on synthetic data. An interesting regression analysis of two real data applications using these procedures unambiguously demonstrates their effectiveness.
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来源期刊
Statistics Surveys
Statistics Surveys STATISTICS & PROBABILITY-
CiteScore
11.70
自引率
0.00%
发文量
5
期刊介绍: Statistics Surveys publishes survey articles in theoretical, computational, and applied statistics. The style of articles may range from reviews of recent research to graduate textbook exposition. Articles may be broad or narrow in scope. The essential requirements are a well specified topic and target audience, together with clear exposition. Statistics Surveys is sponsored by the American Statistical Association, the Bernoulli Society, the Institute of Mathematical Statistics, and by the Statistical Society of Canada.
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