On Choosing Initial Values of Iteratively Reweighted 1 Algorithms for the Piece-wise Exponential Penalty

Abstract

Computing the proximal operator of the sparsity-promoting piece-wise exponential (PiE) penalty 1-e-|x|/σ with a given shape parameter σ>0, which is treated as a popular nonconvex surrogate of 0-norm, is fundamental in feature selection via support vector machines, image reconstruction, zero-one programming problems, compressed sensing, etc. Due to the nonconvexity of PiE, for a long time, its proximal operator is frequently evaluated via an iteratively reweighted 1 algorithm, which substitutes PiE with its first-order approximation, however, the obtained solutions only are the critical point. Based on the exact characterization of the proximal operator of PiE, we explore how the iteratively reweighted 1 solution deviates from the true proximal operator in certain regions, which can be explicitly identified in terms of σ, the initial value and the regularization parameter in the definition of the proximal operator. Moreover, the initial value can be adaptively and simply chosen to ensure that the iteratively reweighted 1 solution belongs to the proximal operator of PiE.

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