LSV-Based Tail Inequalities for Sums of Random Matrices

Chao Zhang; Lei Du; Dacheng Tao

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LSV-Based Tail Inequalities for Sums of Random Matrices

机译：基于LSV的尾部不等式用于随机矩阵求和

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The techniques of random matrices have played an important role in many machine learning models. In this letter, we present a new method to study the tail inequalities for sums of random matrices. Different from other work (Ahlswede & Winter, 2002; Tropp, 2012; Hsu, Kakade, & Zhang, 2012), our tail results are based on the largest singular value (LSV) and independent of the matrix dimension. Since the LSV operation and the expectation are noncommutative, we introduce a diagonalization method to convert the LSV operation into the trace operation of an infinitely dimensional diagonal matrix. In this way, we obtain another version of Laplace-transform bounds and then achieve the LSV-based tail inequalities for sums of random matrices.

机译：随机矩阵技术在许多机器学习模型中发挥了重要作用。在这封信中，我们提出了一种研究随机矩阵之和的尾部不等式的新方法。与其他工作（Ahlswede和Winter，2002； Tropp，2012； Hsu，Kakade和Zhang，2012）不同，我们的尾部结果基于最大奇异值（LSV），并且与矩阵维数无关。由于LSV运算和期望值是不可交换的，因此我们引入对角化方法将LSV运算转换为无限维对角矩阵的跟踪运算。通过这种方式，我们获得了Laplace变换边界的另一种形式，然后获得了基于LSV的随机矩阵和的尾部不等式。

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《Neural computation》 |2017年第1期|247-262|共16页
作者
Chao Zhang; Lei Du; Dacheng Tao;
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作者单位

School of Mathematical Sciences, Dalian University of Technology, Dalian, Liaoning, 116024, P.R.C. chao.zhang@dlut.edu.cn;

School of Mathematical Sciences, Dalian University of Technology, Dalian, Liaoning, 116024, P.R.C. dulei@dlut.edu.cn;

Centre for Artificial Intelligence, Faculty of Engineering and Information Technology, University of Technology Sydney Ultimo, NSW 2007, Australia. dacheng.tao@uts.edu.au;

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收录信息美国《科学引文索引》(SCI);美国《化学文摘》(CA);
原文格式 PDF
正文语种 eng
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1. Tail inequalities for sums of random matrices that depend on the intrinsic dimension [J] . Hsu Daniel, Kakade Sham M., Zhang Tong Electronic Communications in Probability . 2012,第3期

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2. On the distribution tail of the sum of the maxima of two randomly stopped sums in the presence of heavy tails [J] . Tesemnikov P. I. Sibirskie elektronnye matematicheskie izvestiia: Siberian Electronic Mathematical Reports . 2019,第23期

机译：在存在重尾的情况下，两个随机停止的和的最大值的和的分布尾
3. User-Friendly Tail Bounds for Sums of Random Matrices [J] . Tropp J.A. Foundations of computational mathematics . 2012,第4期

机译：用户友好的尾巴界限，用于求和随机矩阵
4. Randomly Weighted Sums of Negatively Associated Random Variables with Heavy Tails [C] . Peng, JiangYan International Conference on Computational Intelligence and Software Engineering;CiSE 2009 . 2009

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5. Random Matrices and the Sum-of-Squares Hierarchy [D] . Schramm, Tselil. 2017

机译：随机矩阵和平方和层次
6. On the Exponential Inequality for Weighted Sums of a Class of Linearly Negative Quadrant Dependent Random Variables [O] . Guodong Xing, Shanchao Yang -1

机译：一类线性负象限相关随机变量加权和的指数不等式
7. Tail inequalities for sums of random matrices that depend on the intrinsic dimension [O] . Daniel Hsu, Sham M. Kakade, Tong Zhang 2012

机译：取决于内在维数的随机矩阵之和的尾部不等式
8. Tail Bounds for All Eigenvalues of a Sum of Random Matrices. [R] . Gittens, A., Tropp, J. A. 2011

机译：随机矩阵和的所有特征值的尾界。

LSV-Based Tail Inequalities for Sums of Random Matrices

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