Geometry of Sparsity-Inducing Norms

Abstract

Sparse optimization seeks an optimal solution with few nonzero entries. To achieve this, it is common to add to the criterion a penalty term proportional to the 1-norm, which is recognized as the archetype of sparsity-inducing norms. In this approach, the number of nonzero entries is not controlled a priori. By contrast, in this paper, our motivation is to find an optimal solution with at most~k nonzero coordinates (or for short, k-sparse vectors), where k is a given sparsity threshold (or ``sparsity budget''). For this purpose, we study the class of generalized k-support dual~norms that arise from any given so-called source norm. When added as a penalty term, we provide conditions under which such generalized k-support dual~norms promote k-sparse solutions. The result follows from an analysis of the exposed faces of closed convex sets generated by k-sparse vectors, and of how primal support identification can be deduced from dual information. Finally, we study some of the geometric properties of the unit balls for the k-support dual~norms and their dual norms when the source norm belongs to the family of p-norms. In particular, we show a striking structural property: every proper face of the unit balls for the k-support dual~norms is a hypersimplex, i.e., the convex hull of 0/1-valued points with the same 0-norm.