Super-resolution multi-reference alignment.

IF 1.6 4区数学 Q2 MATHEMATICS, APPLIED

Information and Inference-A Journal of the Ima Pub Date : 2022-06-01 Epub Date: 2021-02-18 DOI:10.1093/imaiai/iaab003

Tamir Bendory, Ariel Jaffe, William Leeb, Nir Sharon, Amit Singer

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Abstract

We study super-resolution multi-reference alignment, the problem of estimating a signal from many circularly shifted, down-sampled and noisy observations. We focus on the low SNR regime, and show that a signal in $ℝ^{M}$ is uniquely determined when the number L of samples per observation is of the order of the square root of the signal's length ( $L = O (\sqrt{M})$ ). Phrased more informally, one can square the resolution. This result holds if the number of observations is proportional to 1/SNR³. In contrast, with fewer observations recovery is impossible even when the observations are not down-sampled (L = M). The analysis combines tools from statistical signal processing and invariant theory. We design an expectation-maximization algorithm and demonstrate that it can super-resolve the signal in challenging SNR regimes.

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超分辨率多参考对齐。

我们研究的是超分辨率多参考对齐，即从许多圆周位移、下采样和噪声观测中估计信号的问题。我们将重点放在低信噪比机制上，并证明当每个观测点的采样数目为信号长度的平方根数量级（L = O ( M )）时，ℝ M 中的信号是唯一确定的。换个非正式的说法，我们可以将分辨率平方化。如果观测数据的数量与 1/SNR3 成正比，则这一结果成立。相反，如果观测值较少，即使观测值没有降低采样（L = M），也不可能恢复。分析结合了统计信号处理和不变理论的工具。我们设计了一种期望最大化算法，并证明它能在具有挑战性的信噪比情况下超级解译信号。

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来源期刊

Information and Inference-A Journal of the Ima Multiple-

CiteScore

3.90

自引率

0.00%

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