Explicit Series and a Certified Hybrid Evaluator for the $\ell_p$ Proximity Operator for $0<p<1$
Abstract
The nonconvex $\ell_p$ quasi-norm with $0<p<1$ is a powerful sparsity surrogate but makes the proximity operator $\mathrm{prox}_{λ|\cdot|^p}$ nontrivial to evaluate robustly. We give an explicit characterization of the scalar proximal map for all $0<p<1$, including the threshold structure and conditions ensuring strict, isolated solutions. Applying the Lagrange--Bürmann inversion to the stationarity equation yields a uniformly convergent series for the larger positive root, which provides an exa...
Description / Details
The nonconvex quasi-norm with is a powerful sparsity surrogate but makes the proximity operator nontrivial to evaluate robustly. We give an explicit characterization of the scalar proximal map for all , including the threshold structure and conditions ensuring strict, isolated solutions. Applying the Lagrange--Bürmann inversion to the stationarity equation yields a uniformly convergent series for the larger positive root, which provides an exact and numerically stable formula above the classical threshold. We further derive a Mellin--Barnes (MB) integral representation, explaining its radius of convergence and enabling certified truncation. Building on these ingredients, we design a {certified hybrid evaluator} (short series truncated vertical MB segment) with a computable a priori error bound that remains accurate in the near-threshold regime. For rational , Gauss' multiplication formula reduces the coefficients to finite products of shifted Gamma functions, reorganizing the series into a finite sum of generalized hypergeometric functions and explaining the closed forms at . We integrate the evaluator into a proximal-gradient method with an inexact proximal oracle and prove convergence under standard summability of the certificates; MATLAB implementations and numerics confirm accuracy, including near-threshold behavior.
Source: arXiv:2606.31951v1 - http://arxiv.org/abs/2606.31951v1 PDF: https://arxiv.org/pdf/2606.31951v1 Original Link: http://arxiv.org/abs/2606.31951v1
Please sign in to join the discussion.
No comments yet. Be the first to share your thoughts!
Jul 1, 2026
Mathematics
Mathematics
0