Fast sparse reconstruction: Greedy inverse scale space flows

Moeller, Michael; Zhang, Xiaoqun

doi:10.1090/mcom/3004

Fast sparse reconstruction: Greedy inverse scale space flows
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by Michael Moeller and Xiaoqun Zhang PDF

Math. Comp. 85 (2016), 179-208 Request permission

Abstract:

In this paper we analyze the connection between the recently proposed adaptive inverse scale space methods for basis pursuit and the well-known orthogonal matching pursuit method for the recovery of sparse solutions to underdetermined linear systems. Furthermore, we propose a new greedy sparse recovery method, which approximates $\ell ^1$ minimization more closely. A variant of our new approach can increase the support of the current iterate by many indices at once, resulting in an extremely efficient algorithm. Our new method has the advantage that there is a simple criterion to determine a posteriori if an $\ell ^1$ minimizer was found. Numerical comparisons with orthogonal matching pursuit, weak orthogonal matching pursuit, hard thresholding pursuit and compressive sampling matching pursuit underline that our methods indeed inherit some advantageous properties from the inverse scale space flow.

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