This paper focuses on guillotine cuts which often arise in real-life cutting stock problems. In order to construct a solution verifying guillotine constraints, the first step is to know how to determine whether a given cutting pattern is a guillotine pattern. For this purpose, we first characterize guillotine patterns by proving a necessary and sufficient condition. Then, we propose a polynomial algorithm to check this condition. Based on this mathematical characterization of guillotine patterns, we then show that guillotine constraints can be formulated into linear inequalities. The performance of the algorithm to check guillotine cutting patterns is evaluated by means of computational results.
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
AbstractWe present algorithms for the following three-dimensional (3D) guillotine cutting problems: ...
In the two-dimensional cutting problem, a large rectangular sheet has to be dissected into smaller r...
We propose a framework to model general guillotine restrictions in two-dimensional cutting problems ...
We propose a framework to model general guillotine restrictions in two-dimensional cutting problems ...
We address the Constrained Guillotine Cutting Problems (CGCP) in this doctoral thesis. The CGCP cons...
ED EPSInternational audienceIn this paper, we propose approximate and exact algorithms for the doubl...
Imagine a wooden plate with a set of non-overlapping geometric objects painted on it. How many of th...
Le travail de recherche réalisé dans cette thèse concerne le domaine de placement et de découpe à de...
The constrained two-dimensional cutting problem involves maximising the sum of the profits obtained ...
This paper presents an algorithm for the constrained two-dimensional cutting problem of rectangular ...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: Un-bound...
Abstract: This paper presents a heuristic for the constrained two-dimensional cutting problem in whi...
In this paper we tackle the unconstrained non-staged guillotine two-dimensional cutting problem (U2D...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
AbstractWe present algorithms for the following three-dimensional (3D) guillotine cutting problems: ...
In the two-dimensional cutting problem, a large rectangular sheet has to be dissected into smaller r...
We propose a framework to model general guillotine restrictions in two-dimensional cutting problems ...
We propose a framework to model general guillotine restrictions in two-dimensional cutting problems ...
We address the Constrained Guillotine Cutting Problems (CGCP) in this doctoral thesis. The CGCP cons...
ED EPSInternational audienceIn this paper, we propose approximate and exact algorithms for the doubl...
Imagine a wooden plate with a set of non-overlapping geometric objects painted on it. How many of th...
Le travail de recherche réalisé dans cette thèse concerne le domaine de placement et de découpe à de...
The constrained two-dimensional cutting problem involves maximising the sum of the profits obtained ...
This paper presents an algorithm for the constrained two-dimensional cutting problem of rectangular ...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: Un-bound...
Abstract: This paper presents a heuristic for the constrained two-dimensional cutting problem in whi...
In this paper we tackle the unconstrained non-staged guillotine two-dimensional cutting problem (U2D...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
AbstractWe present algorithms for the following three-dimensional (3D) guillotine cutting problems: ...
In the two-dimensional cutting problem, a large rectangular sheet has to be dissected into smaller r...