In this study, a dynamic programming approach to deal with the unconstrained two-dimensional non-guillotine cutting problem is presented. The method extends the recently introduced recursive partitioning approach for the manufacturer's pallet loading problem. The approach involves two phases and uses bounds based on unconstrained two-staged and non-staged guillotine cutting. The method is able to find the optimal cutting pattern of a large number of pro blem instances of moderate sizes known in the literature and a counterexample for which the approach fails to find known optimal solutions was not found. For the instances that the required computer runtime is excessive, the approach is combined with simple heuristics to reduce its running t...
The manufacture of parts made of metal sheet often includes two successive processes: the cutting pr...
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 this study, a dynamic programming approach to deal with the unconstrained two-dimensional non-gui...
In this paper, a dynamic programming-based recursive method is proposed for solving an unconstrained...
In this paper, a heuristic dynamic-programming recursion is proposed for solving unconstrained 2D kn...
We investigate several two-dimensional guillotine cutting stock problems and their variants in which...
In the unconstrained two-dimensional cutting problems (U2DCP) small rectangular objects have to be e...
Abstract: This paper presents a heuristic for the constrained two-dimensional cutting problem in whi...
This paper presents an algorithm for the constrained two-dimensional cutting problem of rectangular ...
In this paper we tackle the unconstrained non-staged guillotine two-dimensional cutting problem (U2D...
We tackle the unconstrained guillotine two-dimensional cutting prob- lem (U2DCP) by a new improved v...
Abstract: Both the material usage and the complexity of the cutting process should be considered in ...
These are 30 instances of the two-dimensional non-guillotine cutting problem, which aims at maximiz...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
The manufacture of parts made of metal sheet often includes two successive processes: the cutting pr...
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 this study, a dynamic programming approach to deal with the unconstrained two-dimensional non-gui...
In this paper, a dynamic programming-based recursive method is proposed for solving an unconstrained...
In this paper, a heuristic dynamic-programming recursion is proposed for solving unconstrained 2D kn...
We investigate several two-dimensional guillotine cutting stock problems and their variants in which...
In the unconstrained two-dimensional cutting problems (U2DCP) small rectangular objects have to be e...
Abstract: This paper presents a heuristic for the constrained two-dimensional cutting problem in whi...
This paper presents an algorithm for the constrained two-dimensional cutting problem of rectangular ...
In this paper we tackle the unconstrained non-staged guillotine two-dimensional cutting problem (U2D...
We tackle the unconstrained guillotine two-dimensional cutting prob- lem (U2DCP) by a new improved v...
Abstract: Both the material usage and the complexity of the cutting process should be considered in ...
These are 30 instances of the two-dimensional non-guillotine cutting problem, which aims at maximiz...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: unbounde...
The manufacture of parts made of metal sheet often includes two successive processes: the cutting pr...
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: ...