2013
DOI: 10.1002/nav.21561
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Bounded flexibility in days-on and days-off scheduling

Abstract: This article presents a flexible days‐on and days‐off scheduling problem and develops an exact branch and price (B&P) algorithm to find solutions. The main objective is to minimize the size of the total workforce required to cover time‐varying demand over a planning horizon that may extend up to 12 weeks. A new aspect of the problem is the general restriction that the number of consecutive days on and the number of consecutive days off must each fall within a predefined range. Moreover, the total assignment of… Show more

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Cited by 16 publications
(10 citation statements)
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References 43 publications
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“…Brunner et al [18] proved that problem P 6 is NP-complete by showing that it has the circulant problem as a special case. Removing all constraints regarding consecutive assignments reduces the problem of finding a feasible solution for P 6 to the problem of finding a feasible flow in network G 1 .…”
Section: Results For Series Constraintsmentioning
confidence: 99%
See 1 more Smart Citation
“…Brunner et al [18] proved that problem P 6 is NP-complete by showing that it has the circulant problem as a special case. Removing all constraints regarding consecutive assignments reduces the problem of finding a feasible solution for P 6 to the problem of finding a feasible flow in network G 1 .…”
Section: Results For Series Constraintsmentioning
confidence: 99%
“…Osogami and Imai [100] and Brunner et al [18] prove that rostering problems with constraints on the number of assignments of particular shifts, and with constraints on consecutive days worked and days-off are hard. Lau [80] describes a shift assignment problem closely related to rostering, and proves its NP-completeness.…”
Section: Introductionmentioning
confidence: 99%
“…Constraints (32) require the decision variables to be either zero or one. Brunner et al (2013) proved that problem P 6 is NP-complete by showing that is has the circulant problem as a special case. Removing all constraints regarding consecutive assignments reduces the problem of finding a feasible solution for P 6 to the problem of finding a feasible flow in network G 1 .…”
Section: Series Constraintsmentioning
confidence: 99%
“…There are only a few authors who have formally determined the hardness of a personnel rostering problem. Osogami and Imai (2000) and Brunner et al (2013) prove that rostering problems with constraints on the number of assignments of particular shifts, and with constraints on consecutive days worked and daysoff are hard. Lau (1996b) describes a shift assignment problem closely related to rostering, and proves its NP-completeness.…”
Section: Introductionmentioning
confidence: 99%
“…Shift and daysoff scheduling problems are equivalent when there is a single shift on a work day. Consequently, related problems are classified under single-shift scheduling (see, e.g., [13,27,5,15,28,37,9]) and multiple-shift scheduling (see, e.g., [56,47,14,39,38]) of a single category or multiple categories of employees. There are other studies which consider employee preferences and hierarchy.…”
mentioning
confidence: 99%