Efficient Computation of the Non-convex Quasi-norm Ball Projection with Iterative Reweighted Approach
Abstract
In this study, we focus on computing the projection onto the p quasi-norm ball, which is challenging due to the non-convex and non-Lipschitz nature inherent in the p quasi-norm with 0<p<1. We propose a novel localized approximation method that yields a Lipschitz continuous concave surrogate function for the p quasi-norm with improved approximation quality. Building on this approximation, we enhance the state-of-the-art iterative reweighted algorithm proposed by Yang et al. (J Mach Learn Res 23:1-31, 2022) by constructing tighter subproblems. This improved algorithm solves the p quasinorm ball projection problem through a series of tractable projections onto the weighted 1 norm balls. Convergence analyses and numerical studies demonstrate the global convergence and superior computational efficiency of the proposed method.
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