Zhengrong Xing, Peter Carbonetto, Matthew Stephens
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引用次数: 0
摘要
信号去噪--也称为非参数回归--通常是通过在变换(如小波)域中进行收缩估计来实现的;变换域中的收缩相当于原始域中的平滑。此类应用中的一个关键问题是缩小多少,或者说,平滑多少。经验贝叶斯收缩方法为这一问题提供了一个极具吸引力的解决方案;它们利用数据来估计潜在 "效应 "的分布,从而自动选择适当的收缩量。然而,大多数现有的经验贝叶斯收缩法的实现都不够灵活,无论是在对基本效应分布的假设上,还是在处理异方差的能力上,都限制了它们在信号去噪方面的应用。为了解决这个问题,我们采用了一种特别灵活、稳定且计算方便的经验贝叶斯收缩方法,并将其应用于几个信号去噪问题。这些应用包括平滑泊松数据和异方差高斯数据。通过经验比较,我们发现该方法的结果与其他方法(包括简单的阈值规则和专门设计的经验贝叶斯程序)相比具有竞争力。我们的方法在 R 软件包 smashr("SMoothing by Adaptive SHrinkage in R")中实现,请访问 https://www.github.com/stephenslab/smashr。
Flexible Signal Denoising via Flexible Empirical Bayes Shrinkage.
Signal denoising-also known as non-parametric regression-is often performed through shrinkage estimation in a transformed (e.g., wavelet) domain; shrinkage in the transformed domain corresponds to smoothing in the original domain. A key question in such applications is how much to shrink, or, equivalently, how much to smooth. Empirical Bayes shrinkage methods provide an attractive solution to this problem; they use the data to estimate a distribution of underlying "effects," hence automatically select an appropriate amount of shrinkage. However, most existing implementations of empirical Bayes shrinkage are less flexible than they could be-both in their assumptions on the underlying distribution of effects, and in their ability to handle heteroskedasticity-which limits their signal denoising applications. Here we address this by adopting a particularly flexible, stable and computationally convenient empirical Bayes shrinkage method and applying it to several signal denoising problems. These applications include smoothing of Poisson data and heteroskedastic Gaussian data. We show through empirical comparisons that the results are competitive with other methods, including both simple thresholding rules and purpose-built empirical Bayes procedures. Our methods are implemented in the R package smashr, "SMoothing by Adaptive SHrinkage in R," available at https://www.github.com/stephenslab/smashr.
期刊介绍:
The Journal of Machine Learning Research (JMLR) provides an international forum for the electronic and paper publication of high-quality scholarly articles in all areas of machine learning. All published papers are freely available online.
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experimental and/or theoretical studies yielding new insight into the design and behavior of learning in intelligent systems;
accounts of applications of existing techniques that shed light on the strengths and weaknesses of the methods;
formalization of new learning tasks (e.g., in the context of new applications) and of methods for assessing performance on those tasks;
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computational models of data from natural learning systems at the behavioral or neural level; or extremely well-written surveys of existing work.