AbstractA set of rectangles S is said to be grid packed if there exists a rectangular grid (not necessarily regular) such that every rectangle lies in the grid and there is at most one rectangle of S in each cell. The area of a grid packing is the area of a minimal bounding box that contains all the rectangles in the grid packing. We present an approximation algorithm that given a set S of rectangles and a real constant ɛ>0 produces a grid packing of S whose area is at most (1+ɛ) times larger than an optimal grid packing in polynomial time. If ɛ is chosen large enough the running time of the algorithm will be linear. We also study several interesting variants, for example the smallest area grid packing containing at least k⩽n rectangles, an...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
AbstractIn the rectangle packing problem we are given a set R of rectangles with positive profits an...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
A set of rectangles S is said to be grid packed if there exists a rectangular grid (not necessarily ...
A set of rectangles S is said to be gridpacked if there exists a rectangular grid (not necessarily r...
A set of rectangles is said to be grid packed if there exists a rectangular grid (not necessarily re...
AbstractA set of rectangles S is said to be grid packed if there exists a rectangular grid (not nece...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
We present new results on the problem of finding an enclos-ing rectangle of minimum area that will c...
The rectangle-packing problem consists of finding an enclosing rectangle of smallest area that can c...
AbstractWe prove that every set of squares with total area 1 can be packed into a rectangle of area ...
The rectangle-packing problem consists of finding an enclosing rectangle of smallest area that can c...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
The rectangle packing problem consists of finding an enclosing rectangle of smallest area that can c...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
AbstractIn the rectangle packing problem we are given a set R of rectangles with positive profits an...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...
A set of rectangles S is said to be grid packed if there exists a rectangular grid (not necessarily ...
A set of rectangles S is said to be gridpacked if there exists a rectangular grid (not necessarily r...
A set of rectangles is said to be grid packed if there exists a rectangular grid (not necessarily re...
AbstractA set of rectangles S is said to be grid packed if there exists a rectangular grid (not nece...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
We present new results on the problem of finding an enclos-ing rectangle of minimum area that will c...
The rectangle-packing problem consists of finding an enclosing rectangle of smallest area that can c...
AbstractWe prove that every set of squares with total area 1 can be packed into a rectangle of area ...
The rectangle-packing problem consists of finding an enclosing rectangle of smallest area that can c...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
The rectangle packing problem consists of finding an enclosing rectangle of smallest area that can c...
Orthogonal packing problems are natural multidimensional generalizations of the classical bin packin...
AbstractIn the rectangle packing problem we are given a set R of rectangles with positive profits an...
AbstractOrthogonal packing problems are natural multidimensional generalizations of the classical bi...