We study the Parallel Task Scheduling problem Pm∣sizej∣Cmax with a constant number of machines. This problem is known to be strongly NP-complete for each m≥5, while it is solvable in pseudo-polynomial time for each m≤3. We give a positive answer to the long-standing open question whether this problem is strongly NP-complete for m=4. As a second result, we improve the lower bound of 1112 for approximating pseudo-polynomial Strip Packing to 45. Since the best known approximation algorithm for this problem has a ratio of 34+ε, this result narrows the gap between approximation ratio and inapproximability result by a significant step. Both results are proven by a reduction from the strongly NP-complete problem 3-Partition.
@article{arxiv.1705.04587,
title = {Complexity and Inapproximability Results for Parallel Task Scheduling and Strip Packing},
author = {Sören Henning and Klaus Jansen and Malin Rau and Lars Schmarje},
journal= {arXiv preprint arXiv:1705.04587},
year = {2017}
}