Add to ORKGIn this paper, we study the problem of computing Euclidean geodesic centers of a polygonal domain P of n vertices. We give a necessary condition for a point being a geodesic center. We show that there is at most one geodesic center among all points of P that have topologically-equivalent shortest path maps. This implies that the total number of geodesic centers is bounded by the size of the shortest path map equivalence decomposition of P, which is known to be O(n^{10}). One key observation is a pi-range property on shortest path lengths when points are moving. With these observations, we propose an algorithm that computes all geodesic centers in O(n^{11}*log(n)) time. Previously, an algorithm of O(n^{12+epsilon}) time was known for this pr...
Given a simple polygon P with n vertices and a set Q of m points in P. we consider the geodesic k-ce...
We give an algorithm to compute a (Euclidean) shortest path in a polygon with h holes and a total o...
This paper studies the geodesic diameter of polygonal domains having h holes and n corners. For simp...
In this paper, we study the problem of computing Euclidean geodesic centers of a polygonal domain $P...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
We present an algorithm that exactly computes the geodesic center of a given polygonal domain. The r...
For any two points in a simple polygon P, the geodesic distance between them is the length of the sh...
For a polygonal domain with h holes and a total of n vertices, we present algorithms that compute th...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
The geodesic edge center of a polygon is a point c inside the polygon that minimizes the maximum geo...
This paper studies the geodesic diameter of polygonal domains having h holes and n corners. For simp...
AbstractAn algorithm is presented for computing geodesic furthest neighbors for all the vertices of ...
Given a simple polygon P with n vertices and a set Q of m points in P. we consider the geodesic k-ce...
We give an algorithm to compute a (Euclidean) shortest path in a polygon with h holes and a total o...
This paper studies the geodesic diameter of polygonal domains having h holes and n corners. For simp...
In this paper, we study the problem of computing Euclidean geodesic centers of a polygonal domain $P...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
We present an algorithm that exactly computes the geodesic center of a given polygonal domain. The r...
For any two points in a simple polygon P, the geodesic distance between them is the length of the sh...
For a polygonal domain with h holes and a total of n vertices, we present algorithms that compute th...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
Let P be a closed simple polygon with n vertices. For any two points in P, the geodesic distance bet...
The geodesic edge center of a polygon is a point c inside the polygon that minimizes the maximum geo...
This paper studies the geodesic diameter of polygonal domains having h holes and n corners. For simp...
AbstractAn algorithm is presented for computing geodesic furthest neighbors for all the vertices of ...
Given a simple polygon P with n vertices and a set Q of m points in P. we consider the geodesic k-ce...
We give an algorithm to compute a (Euclidean) shortest path in a polygon with h holes and a total o...
This paper studies the geodesic diameter of polygonal domains having h holes and n corners. For simp...