A note on the integrality gap of the configuration LP for restricted Santa Claus
July 10, 2018 Β· Declared Dead Β· π Information Processing Letters
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Authors
Klaus Jansen, Lars Rohwedder
arXiv ID
1807.03626
Category
cs.DS: Data Structures & Algorithms
Citations
8
Venue
Information Processing Letters
Last Checked
4 months ago
Abstract
In the restricted Santa Claus problem we are given resources $\mathcal R$ and players $\mathcal P$. Every resource $j\in\mathcal R$ has a value $v_j$ and every player $i$ desires a set $\mathcal R(i)$ of resources. We are interested in distributing the resources to players that desire them. The quality of a solution is measured by the least happy player, i.e., the lowest sum of resource values. This value should be maximized. The local search algorithm by Asadpour et al. and its connection to the configuration LP has proved itself to be a very influential technique for this and related problems. In the original proof, a local search was used to obtain a bound of $4$ for the ratio of the fractional to the integral optimum of the configuration LP (integrality gap). This bound is non-constructive since the local search has not been shown to terminate in polynomial time. On the negative side, the worst instance known has an integrality gap of $2$. Although much progress was made in this area, neither bound has been improved since. We present a better analysis that shows the integrality gap is not worse than $3 + 5/6 \approx 3.8333$.
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