The Two-Dimensional Finite Bin Packing Problem (2BP) consists of determining the minimum number of large identical rectangles, bins, that are required for allocating without overlapping a given set of rectangular items. The items are allocated into a bin with their edges always parallel or orthogonal to the bin edges. The problem is strongly NP-hard and finds many practical applications. In this paper we describe new lower bounds for the 2BP where the items have a fixed orientation and we show that the new lower bounds dominate two lower bounds proposed in the literature. These lower bounds are extended in Part II (see Boschetti and Mingozzi 2002) for a more general version of the 2BP where some items can be rotated by 90°. Moreover, in Par...
We review several algorithms that can be used to solve the problem of packing rectangles into two-di...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
The Two-Dimensional Finite Bin Packing Problem (2BP) consists of determining the minimum number of l...
This paper is the second of a two part series and describes new lower and upper bounds for a more ge...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
AbstractThe three-dimensional finite bin packing problem (3BP) consists of determining the minimum n...
We address the two-dimensional bin packing problem with fixed orientation. This problem requires pac...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
Due to copyright restrictions, the access to the full text of this article is only available via sub...
We study the two-dimensional bin packing problem with and without rotations. Here we are given a set...
We study the two-dimensional bin packing problem with and without rotations. Here we are given a set...
We survey recent advances obtained for the two-dimensional bin packing problem. With regard to heuri...
We review several algorithms that can be used to solve the problem of packing rectangles into two-di...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
The Two-Dimensional Finite Bin Packing Problem (2BP) consists of determining the minimum number of l...
This paper is the second of a two part series and describes new lower and upper bounds for a more ge...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
AbstractThe three-dimensional finite bin packing problem (3BP) consists of determining the minimum n...
We address the two-dimensional bin packing problem with fixed orientation. This problem requires pac...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
Due to copyright restrictions, the access to the full text of this article is only available via sub...
We study the two-dimensional bin packing problem with and without rotations. Here we are given a set...
We study the two-dimensional bin packing problem with and without rotations. Here we are given a set...
We survey recent advances obtained for the two-dimensional bin packing problem. With regard to heuri...
We review several algorithms that can be used to solve the problem of packing rectangles into two-di...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...