Research Report: Exact biconvex reformulation of the 2-0 minimization problem

Abstract

We focus on the minimization of the least square loss function either under a k-sparse constraint or with a sparse penalty term. Based on recent results, we reformulate the 0 pseudo-norm exactly as a convex minimization problem by introducing an auxiliary variable. We then propose an exact biconvex reformulation of the 2-0 constrained and penalized problems. We give correspondence results between minimizers of the initial function and the reformulated ones. The reformulation is biconvex and the non-convexity is due to a penalty term. These two properties are used to derive a minimization algorithm. We apply the algorithm to the problem of single-molecule localization microscopy and compare the results with the well-known Iterative Hard Thresholding algorithm. Visually and numerically the biconvex reformulations perform better.