English

Bridging the Gap Between General and Down-Closed Convex Sets in Submodular Maximization

Machine Learning 2024-01-18 v1 Optimization and Control

Abstract

Optimization of DR-submodular functions has experienced a notable surge in significance in recent times, marking a pivotal development within the domain of non-convex optimization. Motivated by real-world scenarios, some recent works have delved into the maximization of non-monotone DR-submodular functions over general (not necessarily down-closed) convex set constraints. Up to this point, these works have all used the minimum \ell_\infty norm of any feasible solution as a parameter. Unfortunately, a recent hardness result due to Mualem \& Feldman~\cite{mualem2023resolving} shows that this approach cannot yield a smooth interpolation between down-closed and non-down-closed constraints. In this work, we suggest novel offline and online algorithms that provably provide such an interpolation based on a natural decomposition of the convex body constraint into two distinct convex bodies: a down-closed convex body and a general convex body. We also empirically demonstrate the superiority of our proposed algorithms across three offline and two online applications.

Keywords

Cite

@article{arxiv.2401.09251,
  title  = {Bridging the Gap Between General and Down-Closed Convex Sets in Submodular Maximization},
  author = {Loay Mualem and Murad Tukan and Moran Fledman},
  journal= {arXiv preprint arXiv:2401.09251},
  year   = {2024}
}
R2 v1 2026-06-28T14:19:21.792Z