Efficient Temporal Sequence Comparison and Classification Using Gram Matrix Embeddings on a Riemannian Manifold

Xikang Zhang, Yin Wang, Mengran Gou, M. Sznaier, O. Camps
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引用次数: 80

Abstract

In this paper we propose a new framework to compare and classify temporal sequences. The proposed approach captures the underlying dynamics of the data while avoiding expensive estimation procedures, making it suitable to process large numbers of sequences. The main idea is to first embed the sequences into a Riemannian manifold by using positive definite regularized Gram matrices of their Hankelets. The advantages of the this approach are: 1) it allows for using non-Euclidean similarity functions on the Positive Definite matrix manifold, which capture better the underlying geometry than directly comparing the sequences or their Hankel matrices, and 2) Gram matrices inherit desirable properties from the underlying Hankel matrices: their rank measure the complexity of the underlying dynamics, and the order and coefficients of the associated regressive models are invariant to affine transformations and varying initial conditions. The benefits of this approach are illustrated with extensive experiments in 3D action recognition using 3D joints sequences. In spite of its simplicity, the performance of this approach is competitive or better than using state-of-art approaches for this problem. Further, these results hold across a variety of metrics, supporting the idea that the improvement stems from the embedding itself, rather than from using one of these metrics.
黎曼流形上基于Gram矩阵嵌入的有效时间序列比较与分类
在本文中,我们提出了一个新的框架来比较和分类时间序列。所提出的方法捕获了数据的潜在动态,同时避免了昂贵的估计过程,使其适合处理大量序列。主要思想是首先用正定正则化格拉姆矩阵将序列嵌入到黎曼流形中。这种方法的优点是:1)它允许在正定矩阵流形上使用非欧几里得相似函数,这比直接比较序列或它们的汉克尔矩阵更好地捕获底层几何,2)Gram矩阵继承了底层汉克尔矩阵的理想性质。它们的秩衡量了潜在动力学的复杂性,相关回归模型的阶数和系数对仿射变换和不同的初始条件是不变的。这种方法的好处是通过广泛的实验在三维动作识别使用三维关节序列说明。尽管它很简单,但这种方法的性能与使用最先进的方法相比具有竞争力或更好。此外,这些结果跨越了各种度量标准,支持改进源于嵌入本身的想法,而不是使用这些度量标准中的一个。
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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