深度生成解混:Lipschitz信号亚高斯混合解混的误差界

Aaron Berk
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引用次数: 2

摘要

生成式神经网络(gnn)以有效捕获自然图像中的固有低维结构而闻名。本文研究了两个Lipschitz信号的亚高斯解混问题,并以GNN解混为特例。在解混中,人们寻求在给定两个信号的和和先验结构信息的情况下识别它们。在这里,我们假设每个信号都位于Lipschitz函数的范围内,其中包括许多流行的gnn作为特殊情况。我们证明了近乎最优恢复误差的样本复杂度界,它将Bora等人(2017)的最新结果从高斯矩阵的压缩感知设置扩展到亚高斯矩阵的解混。在信号位于凸集的线性信号模型下,McCoy & Tropp(2014)描述了亚高斯混合下识别的样本复杂度。在目前的设置中,信号结构不必是凸的。例如,我们的结果适用于凸锥的非凸并域。我们通过使用训练好的GNNs进行数值模拟来支持这种脱混模型的有效性,这表明一种算法将成为进一步理论研究的有趣对象。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Deep Generative Demixing: Error Bounds for Demixing Subgaussian Mixtures of Lipschitz Signals
Generative neural networks (GNNs) have gained renown for efficaciously capturing intrinsic low-dimensional structure in natural images. Here, we investigate the subgaussian demixing problem for two Lipschitz signals, with GNN demixing as a special case. In demixing, one seeks identification of two signals given their sum and prior structural information. Here, we assume each signal lies in the range of a Lipschitz function, which includes many popular GNNs as a special case. We prove a sample complexity bound for nearly optimal recovery error that extends a recent result of Bora, et al. (2017) from the compressed sensing setting with gaussian matrices to demixing with subgaussian ones. Under a linear signal model in which the signals lie in convex sets, McCoy & Tropp (2014) have characterized the sample complexity for identification under subgaussian mixing. In the present setting, the signal structure need not be convex. For example, our result applies to a domain that is a non-convex union of convex cones. We support the efficacy of this demixing model with numerical simulations using trained GNNs, suggesting an algorithm that would be an interesting object of further theoretical study.
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