The lot-sizing polytope is a fundamental structure contained in many practical production planning problems. Here we study this polytope and identify fact-defining inequalities that cut of all fractional extreme points of its linear programming relaxation, as well as liftings from those facets. We give a polynomial-time combinatorial separation algorithm for the inequalities when capacities are constant. We also report on an extensive computational study on solving the lot-sizing problem for instances up to 365 time periods with varying cost and capacity characteristics
We consider the single item lot-sizing problem with capacities that are non-decreasing over time. Wh...
This paper addresses a multi-stage stochastic integer programming formulation of the uncapacitated l...
The dynamic economic lot sizing model, which lies at the core of numerous production planning applic...
The lot-sizing polytope is a fundamental structure contained in many practical production planning p...
A capacitated multi-stage lot-sizing problem for general product structures with setup and lead time...
AbstractThe traditional lot-sizing problem is to find the least cost production lot-sizes in several...
Based on research on the polyhedral structure of lot-sizing models over the last twenty years, we cl...
A capacitated multi-stage lot-sizing problem for general product structures with setup and lead time...
We consider the classical lot-sizing problem with constant production capacities (LCC) and a variant...
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...
Here we study the discrete lot-sizing problem with an initial stock variable and an associated varia...
International audienceWe consider a problem arising in the context of industrial production planning...
We survey the main results presented in the author’s PhD Thesis presented in June 2003 at the Univer...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
We consider the single item lot-sizing problem with capacities that are non-decreasing over time. Wh...
This paper addresses a multi-stage stochastic integer programming formulation of the uncapacitated l...
The dynamic economic lot sizing model, which lies at the core of numerous production planning applic...
The lot-sizing polytope is a fundamental structure contained in many practical production planning p...
A capacitated multi-stage lot-sizing problem for general product structures with setup and lead time...
AbstractThe traditional lot-sizing problem is to find the least cost production lot-sizes in several...
Based on research on the polyhedral structure of lot-sizing models over the last twenty years, we cl...
A capacitated multi-stage lot-sizing problem for general product structures with setup and lead time...
We consider the classical lot-sizing problem with constant production capacities (LCC) and a variant...
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...
Here we study the discrete lot-sizing problem with an initial stock variable and an associated varia...
International audienceWe consider a problem arising in the context of industrial production planning...
We survey the main results presented in the author’s PhD Thesis presented in June 2003 at the Univer...
We develop an algorithm that solves the constant capacities economic lot-sizing problem with concave...
We consider the single item lot-sizing problem with capacities that are non-decreasing over time. Wh...
This paper addresses a multi-stage stochastic integer programming formulation of the uncapacitated l...
The dynamic economic lot sizing model, which lies at the core of numerous production planning applic...