AbstractThis paper presents a very simple incremental randomized algorithm for computing the trapezoidal decomposition induced by a set S of n line segments in the plane. If S is given as a simple polygonal chain the expected running time of the algorithm is O(n log* n). This leads to a simple algorithm of the same complexity for triangulating polygons. More generally, if S is presented as a plane graph with k connected components, then the expected running time of the algorithm is O(n log* n+k log n). As a by-product our algorithm creates a search structure of expected linear size that allows point location queries in the resulting trapezoidation in logarithmic expected time. The analysis of the expected performance is elementary and strai...
We present randomized algorithms for computing many faces in an arrangement of lines or of segments ...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
Recently it was shown that — under reasonable assumptions— Voronoi diagrams and Delaunay triangulati...
This paper presents a very simple incremental randomized algorithm for computing the trapezoidal dec...
AbstractThis paper presents a very simple incremental randomized algorithm for computing the trapezo...
AbstractThis paper presents a very simple incremental randomized algorithm for computing the trapezo...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
This note combines the lazy randomized incremental construction scheme with the technique of \connec...
A fast, practical, deterministic algorithm for the horizontal trapezoidation of simple polygons is p...
We show that the well-known random incremental construction of Clarkson and Shor can be adapted via ...
This note combines the lazy randomized incremental construction scheme with the technique of \conne...
In this paper, we present an O(n2+|E|3/2) time algorithm for generating triangulations of a simple p...
We present several variants of a new randomized incremental algorithm for computing a cutting in an ...
This paper describes two approaches to triangulate a simple polygon. Emphasis is on practical and ea...
We present randomized algorithms for computing many faces in an arrangement of lines or of segments ...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
Recently it was shown that — under reasonable assumptions— Voronoi diagrams and Delaunay triangulati...
This paper presents a very simple incremental randomized algorithm for computing the trapezoidal dec...
AbstractThis paper presents a very simple incremental randomized algorithm for computing the trapezo...
AbstractThis paper presents a very simple incremental randomized algorithm for computing the trapezo...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
This note combines the lazy randomized incremental construction scheme with the technique of \connec...
A fast, practical, deterministic algorithm for the horizontal trapezoidation of simple polygons is p...
We show that the well-known random incremental construction of Clarkson and Shor can be adapted via ...
This note combines the lazy randomized incremental construction scheme with the technique of \conne...
In this paper, we present an O(n2+|E|3/2) time algorithm for generating triangulations of a simple p...
We present several variants of a new randomized incremental algorithm for computing a cutting in an ...
This paper describes two approaches to triangulate a simple polygon. Emphasis is on practical and ea...
We present randomized algorithms for computing many faces in an arrangement of lines or of segments ...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
Recently it was shown that — under reasonable assumptions— Voronoi diagrams and Delaunay triangulati...