Abstract We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger box where rotation is either forbidden or permitted; we wish to maximize the total profit. Since this optimization problem is NP-hard, we focus on approximation algorithms. We obtain fast and simple algorithms for the non-rotational scenario with approximation ratios 9 + and 8 + as well as an algorithm with approximation ratio 7 + that uses more sophisticated techniques; these are the smallest approximation ratios known for this problem. Furthermore, we show how the used techniques can be adapted to the case where rotation by 90 ◦ either around the z-axis or around all axes is permitted, where we obtain algorithms with approximation ...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: Un-bound...
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...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger box...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger bo...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger box...
We present approximation algorithms for the three-dimensional strip packing problem, and the three-d...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
We study a natural geometric variant of the classic Knapsack problem called 2D-Knapsack: we are give...
Given a set of rectangular three-dimensional items, all of them associated with a profit, and a sing...
There are a lot of natural problems arising in real life that can be modeled as discrete optimizatio...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to ...
Given a set of rectangular items, all of them associated with a profit, and a single bigger rectangu...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: Un-bound...
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...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger box...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger bo...
We study non-overlapping axis-parallel packings of 3D boxes with profits into a dedicated bigger box...
We present approximation algorithms for the three-dimensional strip packing problem, and the three-d...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
We study a natural geometric variant of the classic Knapsack problem called 2D-Knapsack: we are give...
Given a set of rectangular three-dimensional items, all of them associated with a profit, and a sing...
There are a lot of natural problems arising in real life that can be modeled as discrete optimizatio...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to ...
Given a set of rectangular items, all of them associated with a profit, and a single bigger rectangu...
We present algorithms for the following three-dimensional (3D) guillotine cutting problems: Un-bound...
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...