An optimal algorithm for the rectilinear link center of a rectilinear polygon
نویسندگان
چکیده
منابع مشابه
An Optimal Algorithm for Minimum-Link Rectilinear Paths in Triangulated Rectilinear Domains
We consider the problem of finding minimum-link rectilinear paths in rectilinear polygonal domains in the plane. A path or a polygon is rectilinear if all its edges are axis-parallel. Given a set P of h pairwise-disjoint rectilinear polygonal obstacles with a total of n vertices in the plane, a minimumlink rectilinear path between two points is a rectilinear path that avoids all obstacles with ...
متن کاملRectilinear Link Diameter and Radius in a Rectilinear Polygonal Domain
We study the computation of the diameter and radius under the rectilinear link distance within a rectilinear polygonal domain of n vertices and h holes. We introduce a graph of oriented distances to encode the distance between pairs of points of the domain. This helps us transform the problem so that we can search through the candidates more efficiently. Our algorithm computes both the diameter...
متن کاملAn algorithm for converting the contour of a 2D workpiece into a rectilinear polygon
This paper presents an algorithm for converting the contour of a 2D workpiece into a rectilinear polygon. The purpose of providing such a conversion is to mode1 the global shape information of the workpiece. Using an existing algorithm, the rectilinear polygon can further be modeled by a tree structure of line segments, known as the simplified skeleton, which can concisely model the global shap...
متن کاملOn Rectilinear Link Distance
Given a simple polygon P without holes all of whose edges are axis-parallel, a rectilinear path in P is a path that consists of axis-parallel segments only and does not cross any edge of P. The length of such a path is defined as the number of segments it consists of and the rectilinear link distance between two points in P is defined as the length of the shortest path connecting the two points...
متن کاملRectilinear 2-center problems
We present e cient algorithms for two problems of facility location. In both problems we want to optimize the location of two facilities with respect to n given sites. The rst problem, the continuous version, has no restrictions for facility locations but in the second one, the discrete version, facilities are chosen from a speci ed set of possible locations. We consider the rectilinear metric ...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
ژورنال
عنوان ژورنال: Computational Geometry
سال: 1996
ISSN: 0925-7721
DOI: 10.1016/0925-7721(95)00026-7