模态算子,张量受限等距性质,低秩张量恢复

IF 2.6 2区 数学 Q1 MATHEMATICS, APPLIED
Cullen A. Haselby , Mark A. Iwen , Deanna Needell , Michael Perlmutter , Elizaveta Rebrova
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引用次数: 3

摘要

众所周知,在对测量的各种模型假设下,从少量线性测量中恢复稀疏向量和低秩矩阵是可能的。测量矩阵的关键要求通常是受限等距性质,即当作用于要恢复的子空间时近似正交性。在最广泛使用的随机矩阵测量模型中,有(a)独立的亚高斯模型和(b)基于随机傅立叶的模型,可以有效地计算测量值。对于现在普遍存在的张量数据,由于要构建和存储庞大的测量矩阵,将已知的恢复算法直接应用于矢量化或矩阵化张量是记忆繁重的。在本文中,我们提出了基于亚高斯和随机傅立叶测量的模式测量方案。这些模式算子分别作用于张量模式的对或其他子集。它们所需的内存明显少于对矢量化张量进行的测量,可证明满足张量限制的等距性质,并且通过实验可以从较少的测量中恢复张量数据,并且不需要不切实际的存储。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Modewise operators, the tensor restricted isometry property, and low-rank tensor recovery

Recovery of sparse vectors and low-rank matrices from a small number of linear measurements is well-known to be possible under various model assumptions on the measurements. The key requirement on the measurement matrices is typically the restricted isometry property, that is, approximate orthonormality when acting on the subspace to be recovered. Among the most widely used random matrix measurement models are (a) independent subgaussian models and (b) randomized Fourier-based models, allowing for the efficient computation of the measurements.

For the now ubiquitous tensor data, direct application of the known recovery algorithms to the vectorized or matricized tensor is memory-heavy because of the huge measurement matrices to be constructed and stored. In this paper, we propose modewise measurement schemes based on subgaussian and randomized Fourier measurements. These modewise operators act on the pairs or other small subsets of the tensor modes separately. They require significantly less memory than the measurements working on the vectorized tensor, provably satisfy the tensor restricted isometry property and experimentally can recover the tensor data from fewer measurements and do not require impractical storage.

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来源期刊
Applied and Computational Harmonic Analysis
Applied and Computational Harmonic Analysis 物理-物理:数学物理
CiteScore
5.40
自引率
4.00%
发文量
67
审稿时长
22.9 weeks
期刊介绍: Applied and Computational Harmonic Analysis (ACHA) is an interdisciplinary journal that publishes high-quality papers in all areas of mathematical sciences related to the applied and computational aspects of harmonic analysis, with special emphasis on innovative theoretical development, methods, and algorithms, for information processing, manipulation, understanding, and so forth. The objectives of the journal are to chronicle the important publications in the rapidly growing field of data representation and analysis, to stimulate research in relevant interdisciplinary areas, and to provide a common link among mathematical, physical, and life scientists, as well as engineers.
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