Add to ORKGLet P be a set of n points and Q a convex k-gon in R2. We analyze in detail the topological (or discrete) changes in the structure of the Voronoi diagram and the Delaunay triangulation of P, under the convex distance function defined by Q, as the points of P move along prespecified continuous trajectories. Assuming that each point of P moves along an algebraic trajectory of bounded degree, we establish an upper bound of O(k4nλr(n)) on the number of topological changes experienced by the diagrams throughout the motion; here λr(n) is the maximum length of an (n, r)-Davenport-Schinzel sequence, and r is a constant depending on the algebraic degree of the motion of the points. Finally, we describe an algorithm for efficiently maintaining th
Let C be a compact and convex set in the plane that contains the origin in its interior, and let S b...
We are interested in Voronoi diagrams as a tool in robot path planning, where the search for a path...
The concept of convex polygon-offset distance function was introduced in 2001 by Barequet, Dickerson...
Let P be a set of n points and Q a convex k-gon in R2. We analyze in detail the topological (or disc...
AbstractGiven a finite set S of n points in the Euclidean plane E2, we investigate the change of the...
We consider the Voronoi diagram of a set of n points in three dimensions under a convex distance fun...
AbstractGiven a set of n moving points in the plane, how many topological changes occur in the Voron...
Given a set of $n$ moving points in the plane, how many topological changes occur in the Voronoi di...
It is an outstanding open problem of computational geometry to prove a nearquadratic upper bound on ...
Abstract—We study Voronoi diagrams for distance functions that add together two convex functions, ea...
We study the geodesic Voronoi diagram of a set S of n linearly moving sites inside a static simple p...
The combinatorial complexity of the Voronoi diagram of n lines in three dimensions under a convex di...
We give a deterministic O(n log n) sweepline algorithm to construct the generalized Voronoi diagram...
We present an expanding waves view of Voronoi diagrams that allows such diagrams to be defined for...
The Voronoi diagram of a finite set of objects is a fundamental geometric structure that subdivides ...
Let C be a compact and convex set in the plane that contains the origin in its interior, and let S b...
We are interested in Voronoi diagrams as a tool in robot path planning, where the search for a path...
The concept of convex polygon-offset distance function was introduced in 2001 by Barequet, Dickerson...
Let P be a set of n points and Q a convex k-gon in R2. We analyze in detail the topological (or disc...
AbstractGiven a finite set S of n points in the Euclidean plane E2, we investigate the change of the...
We consider the Voronoi diagram of a set of n points in three dimensions under a convex distance fun...
AbstractGiven a set of n moving points in the plane, how many topological changes occur in the Voron...
Given a set of $n$ moving points in the plane, how many topological changes occur in the Voronoi di...
It is an outstanding open problem of computational geometry to prove a nearquadratic upper bound on ...
Abstract—We study Voronoi diagrams for distance functions that add together two convex functions, ea...
We study the geodesic Voronoi diagram of a set S of n linearly moving sites inside a static simple p...
The combinatorial complexity of the Voronoi diagram of n lines in three dimensions under a convex di...
We give a deterministic O(n log n) sweepline algorithm to construct the generalized Voronoi diagram...
We present an expanding waves view of Voronoi diagrams that allows such diagrams to be defined for...
The Voronoi diagram of a finite set of objects is a fundamental geometric structure that subdivides ...
Let C be a compact and convex set in the plane that contains the origin in its interior, and let S b...
We are interested in Voronoi diagrams as a tool in robot path planning, where the search for a path...
The concept of convex polygon-offset distance function was introduced in 2001 by Barequet, Dickerson...