We study the problem of constructing minimum power-$p$ Euclidean $k$-Steiner trees in the plane. The problem is to find a tree of minimum cost spanning a set of given terminals where, as opposed to the minimum spanning tree problem, at most $k$ additional nodes (Steiner points) may be introduced anywhere in the plane. The cost of an edge is its length to the power of $p$ (where $p\geq 1$), and the cost of a network is the sum of all edge costs. We propose two heuristics: a ``beaded" minimum spanning tree heuristic; and a heuristic which alternates between minimum spanning tree construction and a local fixed topology minimisation procedure for locating the Steiner points. We show that the performance ratio $\kappa$ of the beaded-MST heuristi...
Let P and S be two disjoint sets of n and m points in the plane, respectively. We consider the probl...
The 1-Steiner tree problem, the problem of constructing a Steiner minimum tree containing at most on...
While a spanning tree spans all vertices of a given graph, a Steiner tree spans a given subset of ve...
We study the problem of constructing minimum power-$p$ Euclidean $k$-Steiner trees in the plane. The...
AbstractGiven n terminals in the Euclidean plane and a positive constant, find a Steiner tree interc...
Given two sets of points in the plane, P of n terminals and S of m Steiner points, a Steiner tree of...
A Steiner Minimal Tree (SMT) for a given set P of points is a shortest network interconnecting the p...
The Steiner tree problem, named after a Swiss mathematician Jacob Steiner (1796–1863), is a problem ...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
The Minimum Rectilinear Steiner Tree (MRST) problem is to find the minimal spanning tree of a set of...
. The first exact algorithm for the obstacle-avoiding Euclidean Steiner tree problem in the plane (i...
Abstract. Given n terminals in the Euclidean plane and a positive constant, find a Steiner tree inte...
This book is a collection of articles studying various Steiner tree prob lems with applications in ...
Let P and S be two disjoint sets of n and m points in the plane, respectively. We consider the probl...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
Let P and S be two disjoint sets of n and m points in the plane, respectively. We consider the probl...
The 1-Steiner tree problem, the problem of constructing a Steiner minimum tree containing at most on...
While a spanning tree spans all vertices of a given graph, a Steiner tree spans a given subset of ve...
We study the problem of constructing minimum power-$p$ Euclidean $k$-Steiner trees in the plane. The...
AbstractGiven n terminals in the Euclidean plane and a positive constant, find a Steiner tree interc...
Given two sets of points in the plane, P of n terminals and S of m Steiner points, a Steiner tree of...
A Steiner Minimal Tree (SMT) for a given set P of points is a shortest network interconnecting the p...
The Steiner tree problem, named after a Swiss mathematician Jacob Steiner (1796–1863), is a problem ...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
The Minimum Rectilinear Steiner Tree (MRST) problem is to find the minimal spanning tree of a set of...
. The first exact algorithm for the obstacle-avoiding Euclidean Steiner tree problem in the plane (i...
Abstract. Given n terminals in the Euclidean plane and a positive constant, find a Steiner tree inte...
This book is a collection of articles studying various Steiner tree prob lems with applications in ...
Let P and S be two disjoint sets of n and m points in the plane, respectively. We consider the probl...
The Euclidean Steiner tree problem is solved by finding the tree with minimal Euclidean length spann...
Let P and S be two disjoint sets of n and m points in the plane, respectively. We consider the probl...
The 1-Steiner tree problem, the problem of constructing a Steiner minimum tree containing at most on...
While a spanning tree spans all vertices of a given graph, a Steiner tree spans a given subset of ve...