We present several results about Delaunay triangulations (DTs) and convex hulls in transdichotomous and hereditary settings: (i) the DT of a planar point set can be computed in expected time O(sort(n)) on a word RAM, where sort(n)is the time to sort n numbers. We assume that the word RAM supports the shuffle-operation in constant time; (ii) if we know the ordering of a planar point set in x- and in y-direction, its DT can be found by a randomized algebraic computation tree of expected linear depth;(iii) given a universe U of points in the plane, we construct a data structure D for Delaunay queries: for any subset P of U, D can find the DT of P in time O(|P| loglog |U|); (iv) given a universe U of points in 3-space in general convex position...
In this thesis we develop and analyze algorithms for computing space-lling curve orders, Delaunay te...
Over the past decade, the kinetic-data-structures framework has become thestandard in computational ...
We present a new O(n) algorithm to compute good orders for the point set of a Delaunay triangulation...
We present several results about Delaunay triangulations (DTs) and convex hulls in transdichotomous ...
Recently it was shown that — under reasonable assumptions— Voronoi diagrams and Delaunay triangulati...
AbstractThe Delaunay tree is a hierarchical data structure which is defined from the Delaunay triang...
Computing the Delaunay triangulation of n points requires usually a minimum of (n log n) operations...
Recently it was shown that — under reasonable as-sumptions — Voronoi diagrams and Delaunay tri-angul...
AbstractThis paper presents an experimental comparison of a number of different algorithms for compu...
The Delaunay triangulation of n points in the plane can be constructed in o(n log n) time when the c...
p_n}, we are interested in computing T, the set of distinct triangles occurring over all Delaunay tr...
We study some fundamental computational geometry problems with the goal to exploit structure in inpu...
The Delaunay triangulation of n points in the plane can be constructed in o(n log n) time when the c...
In this thesis we develop and analyze algorithms for computing space-lling curve orders, Delaunay te...
Over the past decade, the kinetic-data-structures framework has become thestandard in computational ...
We present a new O(n) algorithm to compute good orders for the point set of a Delaunay triangulation...
We present several results about Delaunay triangulations (DTs) and convex hulls in transdichotomous ...
Recently it was shown that — under reasonable assumptions— Voronoi diagrams and Delaunay triangulati...
AbstractThe Delaunay tree is a hierarchical data structure which is defined from the Delaunay triang...
Computing the Delaunay triangulation of n points requires usually a minimum of (n log n) operations...
Recently it was shown that — under reasonable as-sumptions — Voronoi diagrams and Delaunay tri-angul...
AbstractThis paper presents an experimental comparison of a number of different algorithms for compu...
The Delaunay triangulation of n points in the plane can be constructed in o(n log n) time when the c...
p_n}, we are interested in computing T, the set of distinct triangles occurring over all Delaunay tr...
We study some fundamental computational geometry problems with the goal to exploit structure in inpu...
The Delaunay triangulation of n points in the plane can be constructed in o(n log n) time when the c...
In this thesis we develop and analyze algorithms for computing space-lling curve orders, Delaunay te...
Over the past decade, the kinetic-data-structures framework has become thestandard in computational ...
We present a new O(n) algorithm to compute good orders for the point set of a Delaunay triangulation...