Scalable Bicriteria Algorithms for Non-Monotone Submodular Cover

Abstract

In this paper, we consider the optimization problem (), which is to find a minimum cost subset of a ground set U such that the value of a submodular function f is above a threshold τ. In contrast to most existing work on , it is not assumed that f is monotone. Two bicriteria approximation algorithms are presented for that, for input parameter 0 < ε < 1, give O( 1 / ε2 ) ratio to the optimal cost and ensures the function f is at least τ(1 - ε)/2. A lower bound shows that under the value query model shows that no polynomial-time algorithm can ensure that f is larger than τ/2. Further, the algorithms presented are scalable to large data sets, processing the ground set in a stream. Similar algorithms developed for also work for the related optimization problem of (). Finally, the algorithms are demonstrated to be effective in experiments involving graph cut and data summarization functions.

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