Abstract
Multichannel blind deconvolution is the problem of recovering an unknown signal f and multiple unknown channels xi from their circular convolution yi=xi⊛f (i=1,2,…,N). We consider the case where the xi’s are sparse, and convolution with f is invertible. Our nonconvex optimization formulation solves for a filter h on the unit sphere that produces sparse output yi⊛h. Under some technical assumptions, we show that all local minima of the objective function correspond to the inverse filter of f up to an inherent sign and shift ambiguity, and all saddle points have strictly negative curvatures. This geometric structure allows successful recovery of f and xi using a simple manifold gradient descent (MGD) algorithm. Our theoretical findings are complemented by numerical experiments, which demonstrate superior performance of the proposed approach over the previous methods.
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URL
http://arxiv.org/abs/1805.10437