Parallel-batch scheduling of deteriorating jobs with release dates to minimize the makespan

We consider the problem of scheduling n deteriorating jobs with release dates on a single batching machine. Each job’s processing time is an increasing simple linear function of its starting time. The machine can process up to b jobs simultaneously as a batch. The objective is to minimize the maximu...

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Vydané v:	European journal of operational research Ročník 210; číslo 3; s. 482 - 488
Hlavní autori:	Li, Shisheng, Ng, C.T., Cheng, T.C.E., Yuan, Jinjiang
Médium:	Journal Article
Jazyk:	English
Vydavateľské údaje:	Amsterdam Elsevier B.V 01.05.2011 Elsevier Elsevier Sequoia S.A
Edícia:	European Journal of Operational Research
Predmet:	Algorithms Applied sciences Approximation Batching Deterioration Dynamic programming Exact sciences and technology Infinity Inventory control, production control. Distribution Job shops Mathematical analysis Mathematical models Mathematical programming Operational research Operational research and scientific management Operational research. Management science Optimization algorithms Production scheduling Release dates Scheduling Scheduling Batching Deterioration Release dates Dynamic programming Scheduling, sequencing Studies Batching Scheduling Dynamic programming Release dates Deterioration Task scheduling Processing time Makespan Approximation algorithm Modeling Batch scheduling Workload Batchwise NP hard problem Batch process Batch production Single machine Completion time Execution time
ISSN:	0377-2217, 1872-6860
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Shrnutí:	We consider the problem of scheduling n deteriorating jobs with release dates on a single batching machine. Each job’s processing time is an increasing simple linear function of its starting time. The machine can process up to b jobs simultaneously as a batch. The objective is to minimize the maximum completion time, i.e., makespan. For the unbounded model, i.e., b = ∞, we obtain an O( n log n) dynamic programming algorithm. For the bounded model, i.e., b < n, we first show that the problem is binary NP-hard even if there are only two distinct release dates. Then we present O( nb) and O(( nb/ h) h ) algorithms for the case where the job processing order is predetermined in advance and for the case where there are h, h ⩾ 2, distinct deteriorating rates, respectively. Furthermore, we provide a fully polynomial-time approximation scheme for the case where the number of distinct release dates is a constant.
Bibliografia:	SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 14 ObjectType-Article-2 content type line 23
ISSN:	0377-2217 1872-6860
DOI:	10.1016/j.ejor.2010.11.021