Clustering Geometrically-Modeled Points in the Aggregated Uncertainty Model

Abstract: The k-center problem is to choose a subset of size k from a set of n points such that the maximum distance from each point to its nearest center is minimized. Let Q = {Q1, . . . , Qn} be a set of polygons or segments in the region-based uncertainty model, in which each Qi is an uncertain point, where the exact locations of the points in Qi are unknown. The geometric objects such as segments and polygons can be models of a point set. We define the uncertain version of the k-center problem as a generalization in… Show more

“…We note that other model formulations have also been proposed for dealing with inaccuracies in geometric problems. These are epsilon geometry [33], probabilistic models [6,34], the aggregated uncertainty model [20], and the domain based models [11].…”

Minimum color spanning circle of imprecise points

“…We note that other model formulations have also been proposed for dealing with inaccuracies in geometric problems. These are epsilon geometry [33], probabilistic models [6,34], the aggregated uncertainty model [20], and the domain based models [11].…”

Minimum color spanning circle of imprecise points

The two-center problem of uncertain points on a real line