TY - JOUR
T1 - Periodic scheduling with service constraints
AU - Anily, Shoshana
AU - Bramel, Julien
PY - 2000
Y1 - 2000
N2 - We consider the problem of servicing a number of objects in a discrete time environment. In each period, we may select an object that will receive a service in the period. Each time an object is serviced, we incur a servicing cost dependent on the time since the object's last service. Problems of this type appear in many contexts, e.g., multiproduct lot-sizing, machine maintenance, and several problems in telecommunications. We assume that at most one object can be serviced in a given period. For the general problem with m objects, which is known to be N P-Hard, we describe properties of an optimal policy; and for the specific case of m = 2 objects, we determine an optimal policy.
AB - We consider the problem of servicing a number of objects in a discrete time environment. In each period, we may select an object that will receive a service in the period. Each time an object is serviced, we incur a servicing cost dependent on the time since the object's last service. Problems of this type appear in many contexts, e.g., multiproduct lot-sizing, machine maintenance, and several problems in telecommunications. We assume that at most one object can be serviced in a given period. For the general problem with m objects, which is known to be N P-Hard, we describe properties of an optimal policy; and for the specific case of m = 2 objects, we determine an optimal policy.
UR - http://www.scopus.com/inward/record.url?scp=0034221376&partnerID=8YFLogxK
U2 - 10.1287/opre.48.4.635.12414
DO - 10.1287/opre.48.4.635.12414
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AN - SCOPUS:0034221376
SN - 0030-364X
VL - 48
SP - 635
EP - 645
JO - Operations Research
JF - Operations Research
IS - 4
ER -