AbstractGiven is a set of items and a set of devices, each possessing two limited resources. Each item requires some amounts of these resources. Further, each item is associated with a profit and a color, and items of the same color can share the use of one resource. The goal is to allocate the resources to the most profitable (feasible) subset of items. In alternative formulation, the goal is to pack the most profitable subset of items in a set of two-dimensional bins (knapsacks), in which the capacity in one dimension is sharable. Indeed, the special case where there is a single item in each color is the well-known two-dimensional vector packing (2DVP) problem. Thus, unless P = NP, the problem that we study does not admit a fully polynomi...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We study the 2-dimensional generalization of the classical Bin Packing problem: Given a collection o...
We present an approximation scheme for the two-dimensional version of the knapsack problem which req...
AbstractGiven is a set of items and a set of devices, each possessing two limited resources. Each it...
The two-dimensional bin packing problem is a generalization of the classical bin packing problem and...
AbstractThe two-dimensional bin packing problem is a generalization of the classical bin packing pro...
The bin packing problem has been the corner stone of approximation algorithms and has been extensive...
We present an asymptotic fully polynomial time approximation scheme for the two-dimensional generali...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
We consider a variant of bin packing calledmultiple-choice vector bin packing. In this problem we ar...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We present an approximation scheme for the two-dimensional version of the knapsack problem which req...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We study the 2-dimensional generalization of the classical Bin Packing problem: Given a collection o...
We present an approximation scheme for the two-dimensional version of the knapsack problem which req...
AbstractGiven is a set of items and a set of devices, each possessing two limited resources. Each it...
The two-dimensional bin packing problem is a generalization of the classical bin packing problem and...
AbstractThe two-dimensional bin packing problem is a generalization of the classical bin packing pro...
The bin packing problem has been the corner stone of approximation algorithms and has been extensive...
We present an asymptotic fully polynomial time approximation scheme for the two-dimensional generali...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
We consider a variant of bin packing calledmultiple-choice vector bin packing. In this problem we ar...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We present an approximation scheme for the two-dimensional version of the knapsack problem which req...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
In this paper we introduce a new general framework for set covering problems, based on the combinati...
We study the 2-dimensional generalization of the classical Bin Packing problem: Given a collection o...
We present an approximation scheme for the two-dimensional version of the knapsack problem which req...