Our study of tiling and packing with rectangles in two-dimensional regions is strongly motivated by applications in database mining, histogram-based estimation of query sizes, data partitioning, and motion estimation in video compression by block matching, among others. An example of the problems that we tackle is the following: given an n by n array A of positive numbers, find a tiling using at most p rectangles (that is, no two rectangles must overlap, and each array element must fall within some rectangle) that minimizes the maximum weight of any rectangle; here the "weight" of a rectangle is the sum of the array elements that fall within it. If the array A were one-dimensional, this problem could be easily solved by dynamic programming....
There are a lot of natural problems arising in real life that can be modeled as discrete optimizatio...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
AbstractWe formulate a generalization of the NP-complete rectangle packing problem by parameterizing...
Our study of tiling and packing with rectangles in twodimensional regions is strongly motivated by a...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
AbstractFor a given two-dimensional array of nonnegative numbers and a positive integer p we want to...
We are given a two dimensional array A[1 n � 1 n] where each A[i � j] stores a non-negative number. ...
The first algorithms for the on-line two-dimensional rectangle packing problem were introduced by Co...
In this thesis we address such 2-dimensional packing problems as strip packing, bin packing and stor...
An instance of the two-dimensional strip packing problem is specified by n rectangular items, each h...
We study an interesting geometric optimization problem. We are given a set of rectangles and a recta...
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...
Two-dimensional rectangle packing problem is the problem of packing a series of rectangles into a la...
We study the two-dimensional bin packing problem: Given a list of n rectangles the objective is to f...
There are a lot of natural problems arising in real life that can be modeled as discrete optimizatio...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
AbstractWe formulate a generalization of the NP-complete rectangle packing problem by parameterizing...
Our study of tiling and packing with rectangles in twodimensional regions is strongly motivated by a...
) 1 Introduction We study several rectangle tiling and packing problems. These are natural combina...
AbstractFor a given two-dimensional array of nonnegative numbers and a positive integer p we want to...
We are given a two dimensional array A[1 n � 1 n] where each A[i � j] stores a non-negative number. ...
The first algorithms for the on-line two-dimensional rectangle packing problem were introduced by Co...
In this thesis we address such 2-dimensional packing problems as strip packing, bin packing and stor...
An instance of the two-dimensional strip packing problem is specified by n rectangular items, each h...
We study an interesting geometric optimization problem. We are given a set of rectangles and a recta...
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...
Two-dimensional rectangle packing problem is the problem of packing a series of rectangles into a la...
We study the two-dimensional bin packing problem: Given a list of n rectangles the objective is to f...
There are a lot of natural problems arising in real life that can be modeled as discrete optimizatio...
We study the following packing problem: Given a collection of d-dimensional rectangles of specified ...
AbstractWe formulate a generalization of the NP-complete rectangle packing problem by parameterizing...