Robust Tucker Tensor Decomposition for Effective Image Representation

Miao Zhang, C. Ding
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引用次数: 16

Abstract

Many tensor based algorithms have been proposed for the study of high dimensional data in a large variety of computer vision and machine learning applications. However, most of the existing tensor analysis approaches are based on Frobenius norm, which makes them sensitive to outliers, because they minimize the sum of squared errors and enlarge the influence of both outliers and large feature noises. In this paper, we propose a robust Tucker tensor decomposition model (RTD) to suppress the influence of outliers, which uses L1-norm loss function. Yet, the optimization on L1-norm based tensor analysis is much harder than standard tensor decomposition. In this paper, we propose a simple and efficient algorithm to solve our RTD model. Moreover, tensor factorization-based image storage needs much less space than PCA based methods. We carry out extensive experiments to evaluate the proposed algorithm, and verify the robustness against image occlusions. Both numerical and visual results show that our RTD model is consistently better against the existence of outliers than previous tensor and PCA methods.
鲁棒塔克张量分解的有效图像表示
在各种各样的计算机视觉和机器学习应用中,已经提出了许多基于张量的算法来研究高维数据。然而,现有的张量分析方法大多是基于Frobenius范数的,由于它们将误差的平方和最小化,放大了异常点和大特征噪声的影响,因此对异常点比较敏感。本文提出了一种鲁棒Tucker张量分解模型(RTD),该模型使用l1范数损失函数来抑制异常值的影响。然而,基于l1范数的张量分析的优化比标准张量分解要困难得多。在本文中,我们提出了一种简单有效的算法来求解我们的RTD模型。此外,基于张量分解的图像存储比基于PCA的方法需要更少的空间。我们进行了大量的实验来评估所提出的算法,并验证了对图像遮挡的鲁棒性。数值和视觉结果都表明,我们的RTD模型对异常值的存在始终优于以往的张量和主成分分析方法。
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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