Super-resolution, Extremal Functions and the Condition Number of Vandermonde Matrices

Ankur Moitra
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引用次数: 157

Abstract

Super-resolution is a fundamental task in imaging, where the goal is to extract fine-grained structure from coarse-grained measurements. Here we are interested in a popular mathematical abstraction of this problem that has been widely studied in the statistics, signal processing and machine learning communities. We exactly resolve the threshold at which noisy super-resolution is possible. In particular, we establish a sharp phase transition for the relationship between the cutoff frequency (m) and the separation (Δ). If m > 1/Δ + 1, our estimator converges to the true values at an inverse polynomial rate in terms of the magnitude of the noise. And when m < (1-ε) /Δ no estimator can distinguish between a particular pair of Δ-separated signals even if the magnitude of the noise is exponentially small. Our results involve making novel connections between extremal functions and the spectral properties of Vandermonde matrices. We establish a sharp phase transition for their condition number which in turn allows us to give the first noise tolerance bounds for the matrix pencil method. Moreover we show that our methods can be interpreted as giving preconditioners for Vandermonde matrices, and we use this observation to design faster algorithms for super-resolution. We believe that these ideas may have other applications in designing faster algorithms for other basic tasks in signal processing.
Vandermonde矩阵的超分辨率、极值函数和条件数
超分辨率是成像中的一项基本任务,其目标是从粗粒度测量中提取细粒度结构。在这里,我们感兴趣的是这个问题的一个流行的数学抽象,这个抽象已经在统计学、信号处理和机器学习社区得到了广泛的研究。我们精确地解决了噪声超分辨率成为可能的阈值。特别地,我们建立了截止频率(m)和分离(Δ)之间关系的急剧相变。如果m > 1/Δ + 1,我们的估计器根据噪声的大小以逆多项式的速率收敛到真实值。当m < (1-ε) /Δ时,即使噪声的大小呈指数级小,估计器也无法区分特定的Δ-separated信号对。我们的结果涉及在极值函数和范德蒙德矩阵的谱性质之间建立新的联系。我们为它们的条件数建立了一个尖锐的相变,从而使我们能够给出矩阵铅笔法的第一个噪声容限限。此外,我们表明我们的方法可以解释为给出Vandermonde矩阵的前置条件,并且我们使用这一观察结果来设计更快的超分辨率算法。我们相信这些想法在为信号处理中的其他基本任务设计更快的算法方面可能有其他应用。
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