A key question in modern statistics is how to make fast and reliable inferences for complex, high-dimensional data. While there has been much interest in sparse techniques, current methods do not generalize well to data with nonlinear structure. In this work, we present an orthogonal series estimator for predictors that are complex aggregate objects, such as natural images, galaxy spectra, trajectories, and movies. Our series approach ties together ideas from manifold learning, kernel machine learning, and Fourier methods. We expand the unknown regression on the data in terms of the eigenfunctions of a kernel-based operator, and we take advantage of orthogonality of the basis with respect to the underlying data distribution, $P$, to speed up computations and tuning of parameters. If the kernel is appropriately chosen, then the eigenfunctions adapt to the intrinsic geometry and dimension of the data. We provide theoretical guarantees for a radial kernel with varying bandwidth, and we relate smoothness of the regression function with respect to $P$ to sparsity in the eigenbasis. Finally, using simulated and real-world data, we systematically compare the performance of the spectral series approach with classical kernel smoothing, k-nearest neighbors regression, kernel ridge regression, and state-of-the-art manifold and local regression methods.
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机译:现代统计中的一个关键问题是如何对复杂的高维数据进行快速可靠的推断。尽管人们对稀疏技术有很多兴趣,但是当前的方法不能很好地推广到具有非线性结构的数据。在这项工作中,我们为复杂的聚合对象(例如自然图像,星系光谱,轨迹和电影)的预测变量提供了一个正交序列估计量。我们的系列方法将来自多种学习,内核机器学习和傅立叶方法的思想联系在一起。我们根据基于核的算子的本征函数扩展了数据的未知回归,并且利用基础相对于基础数据分布$ P $的正交性来加快计算和参数调整。如果内核适当地选择,则本征函数适应数据的固有的几何形状和尺寸。我们为带宽可变的径向核提供了理论保证,并且我们将回归函数相对于$ P $的平滑度与本征基的稀疏度相关联。最后,使用模拟和真实数据,我们系统地比较了光谱系列方法与经典核平滑,k最近邻回归,核岭回归以及最新的流形和局部回归方法的性能。
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