We analyze the correctness of an O(n log n) time divide-and-conquer algorithm for the convex hull problem when each input point is a location determined by a normal distribution. We show that the algorithm finds the convex hull of such probabilistic points to precision within some expected correctness determined by a user-given confidence value phi. In order to precisely explain how correct the resulting structure is, we introduce a new certificate error model for calculating and understanding approximate geometric error based on the fundamental properties of a geometric structure. We show that this new error model implies correctness under a robust statistical error model, in which each point lies within the hull with probability at least ...
Dans cette thèse, nous donnons de nouveaux résultats sur la taille moyenne d’enveloppes convexes de ...
Given a set of n points, what is the description complexity of their convex hull? In our world, this...
International audienceWe establish an upper bound on the smoothed complexity of convex hulls in $\m...
29th SIBGRAPI Conference on Graphics, Patterns and Images (2016 : Sao Paulo; Brazil)We analyze the c...
We study the convex-hull problem in a probabilistic setting, motivated by the need to handle data un...
We study the convex-hull problem in a probabilistic setting, motivated by the need to handle data un...
International audienceWe present a simple technique for analyzing the size of geometric hypergraphs ...
Geometric techniques are frequently utilized to analyze and reason about multi-dimensional data. Whe...
We establish an upper bound on the smoothed complexity of convex hulls in R^d under uniform Euclidea...
From a broad perspective, we study issues related to implementation, testing, and experimentation in...
Die Konstruktion der konvexen Hülle einer vorgegebenen Punktmenge im endlich-dimensionalen euklidisc...
AbstractWe consider the computation of the convex hull of a given n-point set in three-dimensional E...
In this dissertation, the author has made an attempt to study the performance characteristics of var...
We describe an O(nd) time algorithm for computing the exact probability that two d-dimensional proba...
The problem of finding the convex hull of the intersection points of random lines was studied in Dev...
Dans cette thèse, nous donnons de nouveaux résultats sur la taille moyenne d’enveloppes convexes de ...
Given a set of n points, what is the description complexity of their convex hull? In our world, this...
International audienceWe establish an upper bound on the smoothed complexity of convex hulls in $\m...
29th SIBGRAPI Conference on Graphics, Patterns and Images (2016 : Sao Paulo; Brazil)We analyze the c...
We study the convex-hull problem in a probabilistic setting, motivated by the need to handle data un...
We study the convex-hull problem in a probabilistic setting, motivated by the need to handle data un...
International audienceWe present a simple technique for analyzing the size of geometric hypergraphs ...
Geometric techniques are frequently utilized to analyze and reason about multi-dimensional data. Whe...
We establish an upper bound on the smoothed complexity of convex hulls in R^d under uniform Euclidea...
From a broad perspective, we study issues related to implementation, testing, and experimentation in...
Die Konstruktion der konvexen Hülle einer vorgegebenen Punktmenge im endlich-dimensionalen euklidisc...
AbstractWe consider the computation of the convex hull of a given n-point set in three-dimensional E...
In this dissertation, the author has made an attempt to study the performance characteristics of var...
We describe an O(nd) time algorithm for computing the exact probability that two d-dimensional proba...
The problem of finding the convex hull of the intersection points of random lines was studied in Dev...
Dans cette thèse, nous donnons de nouveaux résultats sur la taille moyenne d’enveloppes convexes de ...
Given a set of n points, what is the description complexity of their convex hull? In our world, this...
International audienceWe establish an upper bound on the smoothed complexity of convex hulls in $\m...