2019
DOI: 10.1007/978-3-030-22629-9_24
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Flow Shop with Job–Dependent Buffer Requirements—a Polynomial–Time Algorithm and Efficient Heuristics

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Cited by 6 publications
(10 citation statements)
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“…The flow shop problem with spanning buffer is also NP-complete (Lin et al, 2009). Examples for methods from the literature for this flow shop type are a Variable Neighborhood Search by Kononova and Kochetov (2013), where Integer Linear Programming was also used to solve small instances, a Branch-and-Bound algorithm used to calculate lower bounds and optimally solve small instances with up to 18 jobs (Lin et al, 2009) as well as a heuristic based on Lagrangian relaxation and bin packing (Kononov et al, 2019). This buffer type is also analyzed by Gu et al (2018) Figure 1: Overview of works containing comparisons between algorithms for buffered flow shops with intermediate buffers.…”
Section: Related Workmentioning
confidence: 99%
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“…The flow shop problem with spanning buffer is also NP-complete (Lin et al, 2009). Examples for methods from the literature for this flow shop type are a Variable Neighborhood Search by Kononova and Kochetov (2013), where Integer Linear Programming was also used to solve small instances, a Branch-and-Bound algorithm used to calculate lower bounds and optimally solve small instances with up to 18 jobs (Lin et al, 2009) as well as a heuristic based on Lagrangian relaxation and bin packing (Kononov et al, 2019). This buffer type is also analyzed by Gu et al (2018) Figure 1: Overview of works containing comparisons between algorithms for buffered flow shops with intermediate buffers.…”
Section: Related Workmentioning
confidence: 99%
“…As shown in Section 4, the buffered flow shops with b i = c are NP-complete for all buffer models and buffer usage values considered here. However, there exist special cases that are solvable in polynomial time, such as F 2|spanningBuffer , s i = a i |C max with the additional condition that both max a i and max b i do not exceed Ω/5 (Kononov et al, 2019) and F 2|spanningBuffer , s i = a i |C max with the additional constraint max a i ≤ min b i (Min et al, 2019).…”
Section: Polynomial-time Solvable Subcasesmentioning
confidence: 99%
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“…Each job j seizes ω(j) units of storage space (buffer) at the beginning of its processing on M 1 and releases this portion of storage space only at the completion of the job's processing on M 2 . Similar to [14,15,16,20,21] it is assumed that, for each j ∈ N , ω(j) = a j . At any point in time, the total consumption of the storage space cannot exceed Ω -the storage capacity.…”
mentioning
confidence: 99%
“…The computational complexity of the PP-problem motivated interest in branch-and-bound algorithms [14,19,20] as well as in integer programming-based and metaheuristic optimisation methods [16,18]. Another direction of research, triggered by the computational complexity of the PP-probem, was the study of its various particular cases [2,15,17,22,26]. Thus, [15] presents a polynomial-time algorithm and a proof that this algorithm constructs an optimal schedule for any instance of the PP-problem where the storage capacity is not less than five times the maximal processing time.…”
mentioning
confidence: 99%