We study range-searching for colored objects, where one has to count (approximately) the number of colors present in a query range. The problems studied mostly involve orthogonal range-searching in two and three dimensions, and the dual setting of rectangle stabbing by points. We present optimal and near-optimal solutions for these problems. Most of the results are obtained via reductions to the approximate uncolored version, and improved data-structures for them. An additional contribution of this work is the introduction of nested shallow cuttings
In this paper, we consider a variant of the color range reporting problem called color reporting wit...
In colored range counting (CRC), the input is a set of points where each point is assigned a "color"...
Let S be a set of n points in d dimensions, such that each point is assigned a color. Given a query ...
© Timothy M. Chan, Qizheng He, and Yakov Nekrich; licensed under Creative Commons License CC-BY 36th...
In traditional colored range-searching problems, one wants to store a set of n objects with m distin...
In the orthogonal range searching problem we store a set of input points S in a data structure; the ...
In colored range searching, we are given a set of n colored points in d ≥ 2 dimensions to store, and...
In a generalized searching problem, a set $S$ of $n$ colored geometric objects has to be stored in a...
We study the query version of the approximate heavy hitter and quantile problems. In the former prob...
In a generalized searching problem, a set S of n colored geometric objects has to be stored in a dat...
The range searching problem is a fundamental problem in computational geometry, with numerous import...
Range searching is one of the central problems in computational geometry, because it arises in many ...
This thesis discusses four problems in computational geometry. In traditional colored range-searc...
AbstractThe range searching problem is a fundamental problem in computational geometry, with numerou...
Artículo de publicación ISIColored range queries are a well-studied topic in computational geometry ...
In this paper, we consider a variant of the color range reporting problem called color reporting wit...
In colored range counting (CRC), the input is a set of points where each point is assigned a "color"...
Let S be a set of n points in d dimensions, such that each point is assigned a color. Given a query ...
© Timothy M. Chan, Qizheng He, and Yakov Nekrich; licensed under Creative Commons License CC-BY 36th...
In traditional colored range-searching problems, one wants to store a set of n objects with m distin...
In the orthogonal range searching problem we store a set of input points S in a data structure; the ...
In colored range searching, we are given a set of n colored points in d ≥ 2 dimensions to store, and...
In a generalized searching problem, a set $S$ of $n$ colored geometric objects has to be stored in a...
We study the query version of the approximate heavy hitter and quantile problems. In the former prob...
In a generalized searching problem, a set S of n colored geometric objects has to be stored in a dat...
The range searching problem is a fundamental problem in computational geometry, with numerous import...
Range searching is one of the central problems in computational geometry, because it arises in many ...
This thesis discusses four problems in computational geometry. In traditional colored range-searc...
AbstractThe range searching problem is a fundamental problem in computational geometry, with numerou...
Artículo de publicación ISIColored range queries are a well-studied topic in computational geometry ...
In this paper, we consider a variant of the color range reporting problem called color reporting wit...
In colored range counting (CRC), the input is a set of points where each point is assigned a "color"...
Let S be a set of n points in d dimensions, such that each point is assigned a color. Given a query ...