Low-rank Tensor Learning with Nonconvex Overlapped Nuclear Norm Regularization

Quanming Yao, Yaqing Wang, Bo Han, J. Kwok
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Abstract

Nonconvex regularization has been popularly used in low-rank matrix learning. However, extending it for low-rank tensor learning is still computationally expensive. To address this problem, we develop an efficient solver for use with a nonconvex extension of the overlapped nuclear norm regularizer. Based on the proximal average algorithm, the proposed algorithm can avoid expensive tensor folding/unfolding operations. A special"sparse plus low-rank"structure is maintained throughout the iterations, and allows fast computation of the individual proximal steps. Empirical convergence is further improved with the use of adaptive momentum. We provide convergence guarantees to critical points on smooth losses and also on objectives satisfying the Kurdyka-{\L}ojasiewicz condition. While the optimization problem is nonconvex and nonsmooth, we show that its critical points still have good statistical performance on the tensor completion problem. Experiments on various synthetic and real-world data sets show that the proposed algorithm is efficient in both time and space and more accurate than the existing state-of-the-art.
非凸重叠核范数正则化的低秩张量学习
非凸正则化在低秩矩阵学习中得到了广泛的应用。然而,将其扩展到低秩张量学习仍然是计算昂贵的。为了解决这个问题,我们开发了一个有效的求解器,用于重叠核范数正则化器的非凸扩展。基于最近邻平均算法,该算法可以避免昂贵的张量折叠/展开操作。在整个迭代过程中保持了一种特殊的“稀疏加低秩”结构,并允许快速计算单个近端步骤。利用自适应动量进一步改善了经验收敛性。我们在光滑损失和满足Kurdyka-{\L}ojasiewicz条件的目标上给出了临界点的收敛保证。虽然优化问题是非凸和非光滑的,但我们证明了它的临界点在张量补全问题上仍然具有良好的统计性能。在各种合成数据集和实际数据集上的实验表明,该算法在时间和空间上都是有效的,并且比现有的技术更准确。
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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