AbstractThe two-dimensional variable sized bin packing problem (2DVSBPP) is the problem of packing a set of rectangular items into a set of rectangular bins. The bins have different sizes and different costs, and the objective is to minimize the overall cost of bins used for packing the rectangles. We present an integer-linear formulation of the 2DVSBPP and introduce several lower bounds for the problem. By using Dantzig–Wolfe decomposition we are able to obtain lower bounds of very good quality. The LP-relaxation of the decomposed problem is solved through delayed column generation, and an exact algorithm based on branch-and-price is developed. The paper is concluded with a computational study, comparing the tightness of the various lower ...
We study the two|-dimensional geometrical bin packing problem (2DBP): given a list of rectangles, pr...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
AbstractThe two-dimensional variable sized bin packing problem (2DVSBPP) is the problem of packing a...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
We consider two-dimensional bin packing and strip packing problems where the items have to be packed...
We address the two-dimensional bin packing problem with fixed orientation. This problem requires pac...
This article addresses several variants of the two-dimensional bin packing problem. In the most basi...
International audienceWe consider the three-stage two-dimensional bin packing problem (2BP) which oc...
We consider the three-stage two-dimensional bin packing problem (2BP) which occurs in real-world app...
AbstractWe survey recent advances obtained for the two-dimensional bin packing problem, with special...
The Two-Dimensional Finite Bin Packing Problem (2BP) consists of determining the minimum number of l...
The Rectangular Bin-packing Problem, also known as The Two-dimensional Bin-packing Problem (2DBPP), ...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We study the two|-dimensional geometrical bin packing problem (2DBP): given a list of rectangles, pr...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
AbstractThe two-dimensional variable sized bin packing problem (2DVSBPP) is the problem of packing a...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
We consider two-dimensional bin packing and strip packing problems where the items have to be packed...
We address the two-dimensional bin packing problem with fixed orientation. This problem requires pac...
This article addresses several variants of the two-dimensional bin packing problem. In the most basi...
International audienceWe consider the three-stage two-dimensional bin packing problem (2BP) which oc...
We consider the three-stage two-dimensional bin packing problem (2BP) which occurs in real-world app...
AbstractWe survey recent advances obtained for the two-dimensional bin packing problem, with special...
The Two-Dimensional Finite Bin Packing Problem (2BP) consists of determining the minimum number of l...
The Rectangular Bin-packing Problem, also known as The Two-dimensional Bin-packing Problem (2DBPP), ...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We study the two|-dimensional geometrical bin packing problem (2DBP): given a list of rectangles, pr...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...