Abstract
Negatively answering a question posed by Mnich and Wiese (Math. Program. 154(1–2):533–562), we show that \(\hbox {P2}|\hbox {prec}, p_{j}{\in }\{1,2\}|C_{\max }\), the problem of finding a non-preemptive minimum-makespan schedule for precedence-constrained jobs of lengths 1 and 2 on two parallel identical machines, is W[2]-hard parameterized by the width of the partial order giving the precedence constraints. To this end, we show that Shuffle Product, the problem of deciding whether a given word can be obtained by interleaving the letters of \(k\) other given words, is W[2]-hard parameterized by \(k\), thus additionally answering a question posed by Rizzi and Vialette (CSR 2013). Finally, refining a geometric algorithm due to Servakh (Diskretn. Anal. Issled. Oper. 7(1):75–82), we show that the more general Resource-Constrained Project Scheduling problem is fixed-parameter tractable parameterized by the partial order width combined with the maximum allowed difference between the earliest possible and factual starting time of a job.
R. van Bevern—Supported by project 16-31-60007 mol_a_dk of the Russian Foundation for Basic Research.
C. Komusiewicz—Supported by the DFG, project MAGZ (KO 3669/4-1).
N. Talmon—Supported by a postdoctoral fellowship from I-CORE ALGO.
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van Bevern, R., Bredereck, R., Bulteau, L., Komusiewicz, C., Talmon, N., Woeginger, G.J. (2016). Precedence-Constrained Scheduling Problems Parameterized by Partial Order Width. In: Kochetov, Y., Khachay, M., Beresnev, V., Nurminski, E., Pardalos, P. (eds) Discrete Optimization and Operations Research. DOOR 2016. Lecture Notes in Computer Science(), vol 9869. Springer, Cham. https://doi.org/10.1007/978-3-319-44914-2_9
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