none2siWe consider a two-dimensional problem in which one is required to split a given rectangular bin into the smallest number of items. The resulting items must be squares to be packed, without overlapping, into the bin so as to cover all the given rectangle. We present a mathematical model and a heuristic algorithm that is proved to find the optimal solution in some special cases. Then, we introduce a relaxation of the problem and present different exact approaches based on this relaxation. Finally, we report computational experiments on the performances of the algorithms on a large set of randomly generated instances.noneMonaci, Michele*; dos Santos, André GustavoMonaci, Michele*; dos Santos, André Gustav
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to ...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
We consider the problem of determining the smallest square into which a given set of rectangular ite...
We present new results on the problem of finding an enclos-ing rectangle of minimum area that will c...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We study a two-dimensional packing problem where rectangular items are placed into a circular conta...
This paper discusses the minimal area rectangular packing problem which is to pack a given set of re...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to...
Our study of tiling and packing with rectangles in twodimensional regions is strongly motivated by a...
The rectangle packing problem consists of finding an enclosing rectangle of smallest area that can c...
We are given a two dimensional array A[1 n � 1 n] where each A[i � j] stores a non-negative number. ...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to ...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...
We consider the problem of determining the smallest square into which a given set of rectangular ite...
We present new results on the problem of finding an enclos-ing rectangle of minimum area that will c...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
We consider problems requiring to allocate a set of rectangular items to larger rectangular standard...
We study a two-dimensional packing problem where rectangular items are placed into a circular conta...
This paper discusses the minimal area rectangular packing problem which is to pack a given set of re...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to...
Our study of tiling and packing with rectangles in twodimensional regions is strongly motivated by a...
The rectangle packing problem consists of finding an enclosing rectangle of smallest area that can c...
We are given a two dimensional array A[1 n � 1 n] where each A[i � j] stores a non-negative number. ...
In the two-dimensional bin packing problem (2BP) we are given a set of rectangular items, each chara...
We consider the problem of packing rectangles into bins that are unit squares, where the goal is to ...
AbstractGiven a set of rectangular items, and an unlimited number of identical rectangular bins, we ...
Given a set of rectangular items, and an unlimited number of identical rectangular bins, we consider...