English

Multitasking Capacity: Hardness Results and Improved Constructions

Data Structures and Algorithms 2018-09-11 v1 Computational Complexity

Abstract

We consider the problem of determining the maximal α(0,1]\alpha \in (0,1] such that every matching MM of size kk (or at most kk) in a bipartite graph GG contains an induced matching of size at least αM\alpha |M|. This measure was recently introduced in Alon et al. (NIPS 2018) and is motivated by connectionist models of cognition as well as modeling interference in wireless and communication networks. We prove various hardness results for computing α\alpha either exactly or approximately. En route to our results, we also consider the maximum connected matching problem: determining the largest matching NN in a graph GG such that every two edges in NN are connected by an edge. We prove a nearly optimal n1ϵn^{1-\epsilon} hardness of approximation result (under randomized reductions) for connected matching in bipartite graphs (with both sides of cardinality nn). Towards this end we define bipartite half-covers: A new combinatorial object that may be of independent interest. To the best of our knowledge, the best previous hardness result for the connected matching problem was some constant β>1\beta>1. Finally, we demonstrate the existence of bipartite graphs with nn vertices on each side of average degree dd, that achieve α=1/2ϵ\alpha=1/2-\epsilon for matchings of size sufficiently smaller than n/poly(d)n/poly(d). This nearly matches the trivial upper bound of 1/21/2 on α\alpha which holds for any graph containing a path of length 3.

Keywords

Cite

@article{arxiv.1809.02835,
  title  = {Multitasking Capacity: Hardness Results and Improved Constructions},
  author = {Noga Alon and Jonathan D. Cohen and Thomas L. Griffiths and Pasin Manurangsi and Daniel Reichman and Igor Shinkar and Tal Wagner and Alexander Yu},
  journal= {arXiv preprint arXiv:1809.02835},
  year   = {2018}
}

Comments

19 pages

R2 v1 2026-06-23T03:58:57.457Z