textabstractIn this paper we derive a new structural property for an optimal solution of the economic lot-sizing problem with time-invariant cost parameters. We show that the total holding cost in an order interval of an optimal solution is bounded from above by a quantity proportional to the setup cost and the logarithm of the number of periods in the interval. Since we can also show that this bound is tight, this is in contrast to the optimality property of the economic order quantity (EOQ) model, where setup cost and holding cost are perfectly balanced. Furthermore, we show that this property can be used for the design of a new heuristic and that the result may be useful in worst case analysis
We study two different lot-sizing problems with time windows that have been proposed recently. For t...
We address the dynamic lot size problem assuming time-varying storage capacities. The planning horiz...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
We consider the n-period economic lot sizing problem, where the cost coefficients are not restricted...
textabstractWe consider the n-period economic lot sizing problem, where the cost coefficients are no...
An important special case of the economic lot-sizing problem is the one in which there are no specul...
textabstractWe consider an economic order quantity type model with unit out-of-pocket holding costs,...
This paper considers an economic lot sizing model with constant capacity, non-increasing setup cost,...
This paper considers an economic lot sizing model with constant capacity, non-increasing setup cost,...
We consider a continuous-time variant of the classical Economic Lot-Sizing (ELS) problem. In this va...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
Capacity reservation contracts allow a consumer to purchase up to a certain capacity at a unit price...
In this paper, we consider an economic lot-sizing problem with lost sales and bounded inventory. We ...
A class of strong valid inequalities is described for the single-item uncapacitated economic lot-siz...
A class of strong valid inequalities is described for the single-item uncapacitated economic lot-siz...
We study two different lot-sizing problems with time windows that have been proposed recently. For t...
We address the dynamic lot size problem assuming time-varying storage capacities. The planning horiz...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
We consider the n-period economic lot sizing problem, where the cost coefficients are not restricted...
textabstractWe consider the n-period economic lot sizing problem, where the cost coefficients are no...
An important special case of the economic lot-sizing problem is the one in which there are no specul...
textabstractWe consider an economic order quantity type model with unit out-of-pocket holding costs,...
This paper considers an economic lot sizing model with constant capacity, non-increasing setup cost,...
This paper considers an economic lot sizing model with constant capacity, non-increasing setup cost,...
We consider a continuous-time variant of the classical Economic Lot-Sizing (ELS) problem. In this va...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
Capacity reservation contracts allow a consumer to purchase up to a certain capacity at a unit price...
In this paper, we consider an economic lot-sizing problem with lost sales and bounded inventory. We ...
A class of strong valid inequalities is described for the single-item uncapacitated economic lot-siz...
A class of strong valid inequalities is described for the single-item uncapacitated economic lot-siz...
We study two different lot-sizing problems with time windows that have been proposed recently. For t...
We address the dynamic lot size problem assuming time-varying storage capacities. The planning horiz...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...