The Euclidean arborescence problem involves the creation of rooted trees embedded in the plane using the L2 distance metric. These trees are interesting in that they have a low cost yet offer responsive service from the root to any other vertex. As such, arborescences have their cost compared to that of the minimum spanning tree (MST), and their radius compared to that of the shortest path tree (SPT), which are minimal with respect to cost and radius, respectively. This research examines geometric techniques for constructing such arborescences. The central component to this research is the development of a generalized arborescence algorithm framework. Independent framework modules are used to define a unique arborescen...
We present an O(vopt)-approximation algorithm for the maximum leaf spanning arborescence problem, wh...
. The first exact algorithm for the obstacle-avoiding Euclidean Steiner tree problem in the plane (i...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a ¦ set of ...
The Euclidean arborescence problem involves the creation of rooted trees embedded in the plane usin...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
Given a set of nodes N lying on the first quadrant of the Euclidean Plane E 2 , the Rectilinear Mi...
In their seminal paper on Euclidean minimum spanning trees [Discrete & Computational Geometry, 1...
In this thesis the Euclidean Steiner tree problem and the optimisation technique called simulated an...
AbstractWe consider a general class of optimization problems regarding spanning trees in directed gr...
Given a set N of n terminals in the first quadrant of the Euclidean plane E2, find a minimum length ...
[[abstract]]This paper gives the average distance analysis for the Euclidean tree constructed by a s...
The Steiner tree problem is basically a minimum interconnection problem. It is very useful in variou...
AbstractThis paper gives the average distance analysis for the Euclidean tree constructed by a simpl...
In this habilitation thesis several geometrical and combinatorial optimization problems are consider...
We present an O(vopt)-approximation algorithm for the maximum leaf spanning arborescence problem, wh...
. The first exact algorithm for the obstacle-avoiding Euclidean Steiner tree problem in the plane (i...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a ¦ set of ...
The Euclidean arborescence problem involves the creation of rooted trees embedded in the plane usin...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
Given a set of nodes N lying on the first quadrant of the Euclidean Plane E 2 , the Rectilinear Mi...
In their seminal paper on Euclidean minimum spanning trees [Discrete & Computational Geometry, 1...
In this thesis the Euclidean Steiner tree problem and the optimisation technique called simulated an...
AbstractWe consider a general class of optimization problems regarding spanning trees in directed gr...
Given a set N of n terminals in the first quadrant of the Euclidean plane E2, find a minimum length ...
[[abstract]]This paper gives the average distance analysis for the Euclidean tree constructed by a s...
The Steiner tree problem is basically a minimum interconnection problem. It is very useful in variou...
AbstractThis paper gives the average distance analysis for the Euclidean tree constructed by a simpl...
In this habilitation thesis several geometrical and combinatorial optimization problems are consider...
We present an O(vopt)-approximation algorithm for the maximum leaf spanning arborescence problem, wh...
. The first exact algorithm for the obstacle-avoiding Euclidean Steiner tree problem in the plane (i...
We consider the problem of computing the weight of a Euclidean minimum spanning tree for a ¦ set of ...