二元多路数据学习:概率张量分解及其统计最优性。

IF 4.3 3区 计算机科学 Q1 AUTOMATION & CONTROL SYSTEMS
Journal of Machine Learning Research Pub Date : 2020-07-01
Miaoyan Wang, Lexin Li
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引用次数: 0

摘要

我们考虑具有二元项的高阶张量的分解问题。这类数据问题在神经成像、推荐系统、主题建模、传感器网络定位等应用中经常出现。提出了多线性伯努利模型,提出了基于秩约束的似然估计方法,并获得了理论精度保证。与连续值问题相比,根据信噪比,二元张量问题表现出有趣的相变现象。建立了参数张量估计的误差界,并证明了在考虑的模型下得到的速率是极小极大最优的。在此基础上,提出了一种具有收敛性保证的交替优化算法。通过对多个数据集的张量补全和聚类任务的模拟和分析,证明了我们方法的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Learning from Binary Multiway Data: Probabilistic Tensor Decomposition and its Statistical Optimality.

Learning from Binary Multiway Data: Probabilistic Tensor Decomposition and its Statistical Optimality.

Learning from Binary Multiway Data: Probabilistic Tensor Decomposition and its Statistical Optimality.

Learning from Binary Multiway Data: Probabilistic Tensor Decomposition and its Statistical Optimality.

We consider the problem of decomposing a higher-order tensor with binary entries. Such data problems arise frequently in applications such as neuroimaging, recommendation system, topic modeling, and sensor network localization. We propose a multilinear Bernoulli model, develop a rank-constrained likelihood-based estimation method, and obtain the theoretical accuracy guarantees. In contrast to continuous-valued problems, the binary tensor problem exhibits an interesting phase transition phenomenon according to the signal-to-noise ratio. The error bound for the parameter tensor estimation is established, and we show that the obtained rate is minimax optimal under the considered model. Furthermore, we develop an alternating optimization algorithm with convergence guarantees. The efficacy of our approach is demonstrated through both simulations and analyses of multiple data sets on the tasks of tensor completion and clustering.

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来源期刊
Journal of Machine Learning Research
Journal of Machine Learning Research 工程技术-计算机:人工智能
CiteScore
18.80
自引率
0.00%
发文量
2
审稿时长
3 months
期刊介绍: The Journal of Machine Learning Research (JMLR) provides an international forum for the electronic and paper publication of high-quality scholarly articles in all areas of machine learning. All published papers are freely available online. JMLR has a commitment to rigorous yet rapid reviewing. JMLR seeks previously unpublished papers on machine learning that contain: new principled algorithms with sound empirical validation, and with justification of theoretical, psychological, or biological nature; experimental and/or theoretical studies yielding new insight into the design and behavior of learning in intelligent systems; accounts of applications of existing techniques that shed light on the strengths and weaknesses of the methods; formalization of new learning tasks (e.g., in the context of new applications) and of methods for assessing performance on those tasks; development of new analytical frameworks that advance theoretical studies of practical learning methods; computational models of data from natural learning systems at the behavioral or neural level; or extremely well-written surveys of existing work.
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