Greedy Minimization of Weakly Supermodular Set Functions

Abstract

This paper defines weak-α-supermodularity for set functions. Many optimization objectives in machine learning and data mining seek to minimize such functions under cardinality constrains. We prove that such problems benefit from a greedy extension phase. Explicitly, let S* be the optimal set of cardinality k that minimizes f and let S0 be an initial solution such that f(S0)/f(S*) . Then, a greedy extension S ⊃ S0 of size |S| |S0| + α k (/) yields f(S)/f(S*) 1+. As example usages of this framework we give new bicriteria results for k-means, sparse regression, and columns subset selection.