For many algorithms dealing with sets of points in the plane, the only relevant information carried by the input is the combinatorial configuration of the points: the orientation of each triple of points in the set (clockwise, counterclockwise, or collinear). This information is called the order type of the point set. In the dual, realizable order types and abstract order types are combinatorial analogues of line arrangements and pseudoline arrangements. Too often in the literature we analyze algorithms in the real-RAM model for simplicity, putting aside the fact that computers as we know them cannot handle arbitrary real numbers without some sort of encoding. Encoding an order type by the integer coordinates of a realizing point set is kno...
In this work, we present a collection of new results on two fundamental problems in geometric data s...
We revisit the orthogonal range searching problem and the exact l_infinity nearest neighbor searchin...
For any constant d and parameter epsilon > 0, we show the existence of (roughly) 1/epsilon^d orderin...
For many algorithms dealing with sets of points in the plane, the only relevant information carried ...
For most algorithms dealing with sets of points in the plane, the only relevant information carried ...
AbstractThere are several natural ways to extend the notion of the order of points on a line to high...
ABSTRACT We reexamine fundamental problems from computational geometry in the word RAM model, where ...
AbstractMany properties of finite point sets only depend on the relative position of the points, e.g...
Given a planar subdivision whose coordinates are integers bounded by U ≤ 2w [U less than or equal to...
The order type of a point set in Rd maps each (d+1)-tuple of points to its orientation (e.g. clockwi...
We answer a basic data structuring question (for example, raised by Dietz and Raman [1991]): can van...
In their seminal work on Multidimensional Sorting, Goodman and Pollack introduced the so-called orde...
We present subquadratic algorithms in the algebraic decision-tree model for several 3SUM-hard geomet...
AbstractWe present a new I/O-efficient index structure for storing planar subdivisions. This so-call...
In this work, we present a collection of new results on two fundamental problems in geometric data s...
In this work, we present a collection of new results on two fundamental problems in geometric data s...
We revisit the orthogonal range searching problem and the exact l_infinity nearest neighbor searchin...
For any constant d and parameter epsilon > 0, we show the existence of (roughly) 1/epsilon^d orderin...
For many algorithms dealing with sets of points in the plane, the only relevant information carried ...
For most algorithms dealing with sets of points in the plane, the only relevant information carried ...
AbstractThere are several natural ways to extend the notion of the order of points on a line to high...
ABSTRACT We reexamine fundamental problems from computational geometry in the word RAM model, where ...
AbstractMany properties of finite point sets only depend on the relative position of the points, e.g...
Given a planar subdivision whose coordinates are integers bounded by U ≤ 2w [U less than or equal to...
The order type of a point set in Rd maps each (d+1)-tuple of points to its orientation (e.g. clockwi...
We answer a basic data structuring question (for example, raised by Dietz and Raman [1991]): can van...
In their seminal work on Multidimensional Sorting, Goodman and Pollack introduced the so-called orde...
We present subquadratic algorithms in the algebraic decision-tree model for several 3SUM-hard geomet...
AbstractWe present a new I/O-efficient index structure for storing planar subdivisions. This so-call...
In this work, we present a collection of new results on two fundamental problems in geometric data s...
In this work, we present a collection of new results on two fundamental problems in geometric data s...
We revisit the orthogonal range searching problem and the exact l_infinity nearest neighbor searchin...
For any constant d and parameter epsilon > 0, we show the existence of (roughly) 1/epsilon^d orderin...