We introduce and study the general problem of finding a most "scale-free-like" spanning tree of a connected graph. It is motivated by a particular problem in epidemiology, and may be useful in studies of various dynamical processes in networks. We employ two possible objective functions for this problem and introduce the corresponding algorithmic problems termed $m$-SF and $s$-SF Spanning Tree problems. We prove that those problems are APX- and NP-hard, respectively, even in the classes of cubic, bipartite and split graphs. We study the relations between scale-free spanning tree problems and the max-leaf spanning tree problem, which is the classical algorithmic problem closest to ours. For split graphs, we explicitly describe the structure ...
Given a graph G = (V, E), the maximum leaf spanning tree problem (MLSTP) is to find a spanning tree ...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
This chapter is devoted to compact extended formulations of tree problems. First, we give a compact ...
The semi-streaming model is a variant of the streaming model frequently used for the computation of ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
The minimum spanning tree problem with an added constraint that no node in the spanning tree has the...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
AbstractTree spanner problems have important applications in network design, e.g. in the telecommuni...
Abstract—We consider the problem of constructing a single spanning tree for the single-sink buy-at-b...
AbstractWe consider the problem of finding a spanning tree with maximum number of leaves. A 2-approx...
AbstractIn this paper we present some new results concerning the classification of undirected spanni...
A network is a system that involves movement or flow of some commodities such as goods and services....
The problem of finding a spanning tree in an undirected graph with a maximum number of leaves is kno...
AbstractWe study the complexity of the problem of deciding the existence of a spanning subgraph of a...
AbstractWe show that testing if an undirected graph contains a bridgeless spanning cactus is NP-hard...
Given a graph G = (V, E), the maximum leaf spanning tree problem (MLSTP) is to find a spanning tree ...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
This chapter is devoted to compact extended formulations of tree problems. First, we give a compact ...
The semi-streaming model is a variant of the streaming model frequently used for the computation of ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
The minimum spanning tree problem with an added constraint that no node in the spanning tree has the...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
AbstractTree spanner problems have important applications in network design, e.g. in the telecommuni...
Abstract—We consider the problem of constructing a single spanning tree for the single-sink buy-at-b...
AbstractWe consider the problem of finding a spanning tree with maximum number of leaves. A 2-approx...
AbstractIn this paper we present some new results concerning the classification of undirected spanni...
A network is a system that involves movement or flow of some commodities such as goods and services....
The problem of finding a spanning tree in an undirected graph with a maximum number of leaves is kno...
AbstractWe study the complexity of the problem of deciding the existence of a spanning subgraph of a...
AbstractWe show that testing if an undirected graph contains a bridgeless spanning cactus is NP-hard...
Given a graph G = (V, E), the maximum leaf spanning tree problem (MLSTP) is to find a spanning tree ...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
This chapter is devoted to compact extended formulations of tree problems. First, we give a compact ...