A unified analysis of convex and non-convex lp-ball projection problems

Abstract

The task of projecting onto p norm balls is ubiquitous in statistics and machine learning, yet the availability of actionable algorithms for doing so is largely limited to the special cases of p = \ 0, 1,2, ∞ \. In this paper, we introduce novel, scalable methods for projecting onto the p ball for general p>0. For p ≥1 , we solve the univariate Lagrangian dual via a dual Newton method. We then carefully design a bisection approach for p<1, presenting theoretical and empirical evidence of zero or a small duality gap in the non-convex case. The success of our contributions is thoroughly assessed empirically, and applied to large-scale regularized multi-task learning and compressed sensing.