REGULARIZATION USING DENOISING: EXACT AND ROBUST SIGNAL RECOVERY
Ruturaj Gavaskar, Kunal Chaudhury
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We consider the problem of signal reconstruction from linearly corrupted data using plug-and-play (PnP) regularization. As opposed to traditional sparsity-promoting regularizers, PnP uses an off-the-shelf denoiser within a proximal algorithm such as ISTA or ADMM for image reconstruction. Although PnP has become popular in the imaging community, its regularization capacity is not fully understood. For example, it is not known if PnP can in theory recover a signal from few noiseless measurements as in classical compressed sensing and if the recovery is robust. We explore these questions in this work and present some theoretical and experimental results. In particular, we prove that if the denoiser in question has low rank and if the ground-truth lies in the range of the denoiser, then it can be recovered exactly from noiseless measurements. To the best of knowledge, this is first such result. Furthermore, we show using numerical simulations that even if the aforementioned conditions are violated, PnP recovery is robust in practice. We formulate a theorem regarding the recovery error based on these observations.