AbstractIn their seminal paper on geometric minimum spanning trees, Monma and Suri (1992) [31] showed how to embed any tree of maximum degree 5 as a minimum spanning tree in the Euclidean plane. The embeddings provided by their algorithm require area O(2n2)×O(2n2) and the authors conjectured that an improvement below cn×cn is not possible, for some constant c>0. In this paper, we show how to construct MST embeddings of arbitrary trees of maximum degree 3 and 4 within polynomial area
\newcommand{\subdG}[1][G]{#1^\star} Given a graph $G$ and a positive integer $k$, we study the que...
The minimum spanning tree problem with an added constraint that no node in the spanning tree has the...
In the longest plane spanning tree problem, we are given a finite planar point set ?, and our task i...
AbstractIn their seminal paper on geometric minimum spanning trees, Monma and Suri (1992) [31] showe...
In their seminal paper on geometric minimum spanning trees, Monma and Suri [6] gave a method to embe...
In their seminal paper on Euclidean minimum spanning trees [Discrete & Computational Geometry, 1...
AbstractGiven n points in the Euclidean plane, the degree-δ minimum spanning tree (MST) problem asks...
Motivated by practical VLSI routing applications, we study the maximum vertex degree of a minimum sp...
AbstractIn the minimum-degree minimum spanning tree (MDMST) problem, we are given a graph G, and the...
We prove that any n-vertex graph of maximum degree r(r=3 or 4) can be embedded in a square grid of a...
We prove that, if $m$ is sufficiently large, every graph on $m+1$ vertices that has a universal vert...
AbstractWe study the approximability of some problems which aim at finding spanning trees in undirec...
We study the following maximization problem in the Euclidean plane: Given a collection of neighborho...
Bounded-angle spanning trees of points in the plane have received considerable attention in the cont...
We consider the problem of finding a spanning tree that maximizes the number of leaves (Max Leaf). W...
\newcommand{\subdG}[1][G]{#1^\star} Given a graph $G$ and a positive integer $k$, we study the que...
The minimum spanning tree problem with an added constraint that no node in the spanning tree has the...
In the longest plane spanning tree problem, we are given a finite planar point set ?, and our task i...
AbstractIn their seminal paper on geometric minimum spanning trees, Monma and Suri (1992) [31] showe...
In their seminal paper on geometric minimum spanning trees, Monma and Suri [6] gave a method to embe...
In their seminal paper on Euclidean minimum spanning trees [Discrete & Computational Geometry, 1...
AbstractGiven n points in the Euclidean plane, the degree-δ minimum spanning tree (MST) problem asks...
Motivated by practical VLSI routing applications, we study the maximum vertex degree of a minimum sp...
AbstractIn the minimum-degree minimum spanning tree (MDMST) problem, we are given a graph G, and the...
We prove that any n-vertex graph of maximum degree r(r=3 or 4) can be embedded in a square grid of a...
We prove that, if $m$ is sufficiently large, every graph on $m+1$ vertices that has a universal vert...
AbstractWe study the approximability of some problems which aim at finding spanning trees in undirec...
We study the following maximization problem in the Euclidean plane: Given a collection of neighborho...
Bounded-angle spanning trees of points in the plane have received considerable attention in the cont...
We consider the problem of finding a spanning tree that maximizes the number of leaves (Max Leaf). W...
\newcommand{\subdG}[1][G]{#1^\star} Given a graph $G$ and a positive integer $k$, we study the que...
The minimum spanning tree problem with an added constraint that no node in the spanning tree has the...
In the longest plane spanning tree problem, we are given a finite planar point set ?, and our task i...