English

Near-optimal asymmetric binary matrix partitions

Computer Science and Game Theory 2015-04-09 v3 Computational Complexity

Abstract

We study the asymmetric binary matrix partition problem that was recently introduced by Alon et al. (WINE 2013) to model the impact of asymmetric information on the revenue of the seller in take-it-or-leave-it sales. Instances of the problem consist of an n×mn \times m binary matrix AA and a probability distribution over its columns. A partition scheme B=(B1,...,Bn)B=(B_1,...,B_n) consists of a partition BiB_i for each row ii of AA. The partition BiB_i acts as a smoothing operator on row ii that distributes the expected value of each partition subset proportionally to all its entries. Given a scheme BB that induces a smooth matrix ABA^B, the partition value is the expected maximum column entry of ABA^B. The objective is to find a partition scheme such that the resulting partition value is maximized. We present a 9/109/10-approximation algorithm for the case where the probability distribution is uniform and a (11/e)(1-1/e)-approximation algorithm for non-uniform distributions, significantly improving results of Alon et al. Although our first algorithm is combinatorial (and very simple), the analysis is based on linear programming and duality arguments. In our second result we exploit a nice relation of the problem to submodular welfare maximization.

Keywords

Cite

@article{arxiv.1407.8170,
  title  = {Near-optimal asymmetric binary matrix partitions},
  author = {Fidaa Abed and Ioannis Caragiannis and Alexandros A. Voudouris},
  journal= {arXiv preprint arXiv:1407.8170},
  year   = {2015}
}

Comments

17 pages

R2 v1 2026-06-22T05:17:00.559Z