The problem of computing a representation of the stabbing lines of a set S of segments in the plane was solved by Edelsbrunner et al. We provide efficient algorithms for the following problems: computing the stabbing wedges for S, finding a stabbing wedge for a set of parallel segments with equal length, and computing other stabbers for S such as a double-wedge and a zigzag. The time and space complexities of the algorithms depend on the number of combinatorially different extreme lines, critical lines, and the number of different slopes that appear in S
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
The (axis-parallel) stabbing number of a given set of line segments is the maximum number of segment...
The problem of computing a representation of the stabbing lines of a set S of segments in the plane ...
AbstractThe problem of computing a representation of the stabbing lines of a set S of segments in th...
The problem of computing a representation of the stabbing lines of a set S of segments in the plane ...
AbstractThe problem of computing a representation of the stabbing lines of a set S of segments in th...
Given a set S of n line segments in the plane, we say that a region R¿R2 is a stabber for S if R...
Given a set of n line segments in the plane, we say that a region R of the plane is a stabber if R c...
We consider stabbing regions for a set S of n line segments in the plane, that is, regions in the pl...
Given a set of n line segments in the plane, we say that a region R ⊆ R2 is a stabber if R contains ...
We consider stabbing regions for a set S of n line segments in the plane, that is, regions in the pl...
We study a class of geometric stabbing/covering problems for sets of line segments, rays, and lines ...
Given a set S of n line segments in the plane, we say that a region R¿R2 is a stabber for S if R...
AbstractWe study a class of geometric stabbing/covering problems for sets of line segments, rays and...
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
The (axis-parallel) stabbing number of a given set of line segments is the maximum number of segment...
The problem of computing a representation of the stabbing lines of a set S of segments in the plane ...
AbstractThe problem of computing a representation of the stabbing lines of a set S of segments in th...
The problem of computing a representation of the stabbing lines of a set S of segments in the plane ...
AbstractThe problem of computing a representation of the stabbing lines of a set S of segments in th...
Given a set S of n line segments in the plane, we say that a region R¿R2 is a stabber for S if R...
Given a set of n line segments in the plane, we say that a region R of the plane is a stabber if R c...
We consider stabbing regions for a set S of n line segments in the plane, that is, regions in the pl...
Given a set of n line segments in the plane, we say that a region R ⊆ R2 is a stabber if R contains ...
We consider stabbing regions for a set S of n line segments in the plane, that is, regions in the pl...
We study a class of geometric stabbing/covering problems for sets of line segments, rays, and lines ...
Given a set S of n line segments in the plane, we say that a region R¿R2 is a stabber for S if R...
AbstractWe study a class of geometric stabbing/covering problems for sets of line segments, rays and...
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
Stabbing a set S of n segments in the plane by a line is a well-known problem. In this paper we cons...
The (axis-parallel) stabbing number of a given set of line segments is the maximum number of segment...