Spectral Discovery of Jointly Smooth Features for Multimodal Data

IF 1.9 Q1 MATHEMATICS, APPLIED
Or Yair, Felix Dietrich, Rotem Mulayoff, R. Talmon, I. Kevrekidis
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引用次数: 6

Abstract

In this paper, we propose a spectral method for deriving functions that are jointly smooth on multiple observed manifolds. Our method is unsupervised and primarily consists of two steps. First, using kernels, we obtain a subspace spanning smooth functions on each manifold. Then, we apply a spectral method to the obtained subspaces and discover functions that are jointly smooth on all manifolds. We show analytically that our method is guaranteed to provide a set of orthogonal functions that are as jointly smooth as possible, ordered from the smoothest to the least smooth. In addition, we show that the proposed method can be efficiently extended to unseen data using the Nystrom method. We demonstrate the proposed method on both simulated and real measured data and compare the results to nonlinear variants of the seminal Canonical Correlation Analysis (CCA). Particularly, we show superior results for sleep stage identification. In addition, we show how the proposed method can be leveraged for finding minimal realizations of parameter spaces of nonlinear dynamical systems.
多模态数据联合光滑特征的光谱发现
在本文中,我们提出了一种谱方法来推导在多个观测流形上联合光滑的函数。我们的方法是无监督的,主要包括两个步骤。首先,利用核,我们得到了在每个流形上生成光滑函数的子空间。然后,我们对得到的子空间应用谱方法,发现在所有流形上联合光滑的函数。我们解析地证明了我们的方法保证提供一组尽可能联合光滑的正交函数,从光滑到最不光滑排序。此外,我们还证明了该方法可以有效地扩展到使用Nystrom方法的未知数据。我们在模拟和实际测量数据上验证了所提出的方法,并将结果与经典相关分析(CCA)的非线性变量进行了比较。特别是,我们在睡眠阶段识别方面取得了优异的结果。此外,我们还展示了如何利用所提出的方法来寻找非线性动力系统参数空间的最小实现。
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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