Enumerations and stability analysis of feasible and optimal line balances for simple assembly lines

Enumerations and stability analysis of feasible and optimal line balances for simple assembly lines

•Simple assembly line balancing problems are studied.•Stability of line balances with respect to variations of processing times is investigated.•Algorithms for constructing feasible and stable optimal line balances are proposed.•Computational results for benchmark instances are discussed.•Complexity...

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Bibliographic Details
Published in:Computers & industrial engineering Vol. 90; pp. 241 - 258
Main Authors: Sotskov, Yuri N., Dolgui, Alexandre, Lai, Tsung-Chyan, Zatsiupa, Aksana
Format: Journal Article
Language:English
Published: Elsevier Ltd 01-12-2015
Elsevier
Subjects:
Assembly line balancing
Assembly lines
Balancing
Combinatorial optimization
Complexity analysis
Computer Science
Computer simulation
Manuals
Modeling and Simulation
Optimization
Stability
Stability radius
Tasks
Uncertain processing times
Workstations
Uncertain processing times
Complexity analysis
Assembly line balancing
Combinatorial optimization
Stability radius
Combinatorial optimizatoin
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Summary:•Simple assembly line balancing problems are studied.•Stability of line balances with respect to variations of processing times is investigated.•Algorithms for constructing feasible and stable optimal line balances are proposed.•Computational results for benchmark instances are discussed.•Complexity analysis has also been developed. For a simple assembly line, it is necessary to minimize a number of the workstations for processing a partially ordered set of the tasks V={1,2,…,n} within a fixed cycle time (such a problem is denoted as SALBP-1). A dual assembly line balancing problem denoted as SALBP-2 is to minimize a cycle time provided that a number of the workstations is fixed. An initial vector t=(t1,t2,…,tn) of the processing times of the tasks V is given for both problems SALBP-1 and SALBP-2. For a subset V∼⊆V of the manual tasks j∈V∼, the processing times tj may vary since operators may have different skills, levels of fatigue, experience, and motivation. For any automated task i∈V⧹V∼, the processing time ti cannot vary. We investigate a stability of an optimal line balance for the assembly line with respect to variations of the processing times of the manual tasks (a line balance is stable, if it is optimal for any sufficiently small variation of the processing times). We developed the enumerative algorithms for constructing feasible and stable optimal line balances for the problem SALBP-1 and those for the problem SALBP-2. Computational results for the stability of the assembly line balances showed that there are a lot of unstable optimal line balances for the tested benchmark assembly lines. The simulation for the benchmark assembly line showed that the stable optimal line balance considerably outperforms the unstable ones. The complexity analysis of the assembly line balancing problems with different partial orders given on the task set V has been developed.
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content type line 23
ISSN:0360-8352
1879-0550
DOI:10.1016/j.cie.2015.08.018