English

Online submodular welfare maximization: Greedy is optimal

Data Structures and Algorithms 2013-01-31 v2

Abstract

We prove that no online algorithm (even randomized, against an oblivious adversary) is better than 1/2-competitive for welfare maximization with coverage valuations, unless NP=RPNP = RP. Since the Greedy algorithm is known to be 1/2-competitive for monotone submodular valuations, of which coverage is a special case, this proves that Greedy provides the optimal competitive ratio. On the other hand, we prove that Greedy in a stochastic setting with i.i.d.items and valuations satisfying diminishing returns is (11/e)(1-1/e)-competitive, which is optimal even for coverage valuations, unless NP=RPNP=RP. For online budget-additive allocation, we prove that no algorithm can be 0.612-competitive with respect to a natural LP which has been used previously for this problem.

Keywords

Cite

@article{arxiv.1204.1025,
  title  = {Online submodular welfare maximization: Greedy is optimal},
  author = {Michael Kapralov and Ian Post and Jan Vondrak},
  journal= {arXiv preprint arXiv:1204.1025},
  year   = {2013}
}
R2 v1 2026-06-21T20:44:47.581Z