We consider two related problems, the Minimum Bounded Degree Matroid Basis problem and the Minimum Bounded Degree Submodular Flow problem. The first problem is a generalization of the Minimum Bounded Degree Spanning Tree problem: we are given a matroid and a hypergraph on its ground set with lower and upper bounds f(e)≥ g(e) for each hyperedge e. The task is to find a minimum cost basis which contains at least f(e) and at most g(e) elements from each hyperedge e. In the second problem we have a submodular flow problem, a lower bound f(v) and an upper bound g(v) for each node v, and the task is to find a minimum cost 0-1 submodular flow with the additional constraint that the sum of the incoming and outgoing flow at each node v is between f(...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
Submodular functions are common in combinatorics; examples include the cut capacity function of a gr...
Given a connected graph G, a vertex v of G is said to be a branch vertex if its degree is greater th...
We consider two related problems, the Minimum Bounded Degree Matroid Basis problem and the Minimum B...
AbstractIn the minimum-degree minimum spanning tree (MDMST) problem, we are given a graph G, and the...
In the Minimum Bounded Degree Spanning Tree problem, we are given an undirected graph G=(V,E) with a...
We present polynomial-time approximation algorithms for some degree-bounded directed network design ...
htmlabstractIterative rounding and relaxation have arguably become the method of choice in dealing w...
The main result of this paper is motivated by the following two apparently unrelated graph optimizat...
\newcommand{\subdG}[1][G]{#1^\star} Given a graph $G$ and a positive integer $k$, we study the que...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each ve...
A general instance of a Degree-Constrained Subgraph problem consists of an edge-weighted or vertex-w...
Abstract. In this paper, we study the minimum degree minimum span-ning tree problem: Given a graph G...
Cataloged from PDF version of article.Given an undirected network with positive edge costs and a pos...
AbstractIn this article we provide hardness results and approximation algorithms for the following t...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
Submodular functions are common in combinatorics; examples include the cut capacity function of a gr...
Given a connected graph G, a vertex v of G is said to be a branch vertex if its degree is greater th...
We consider two related problems, the Minimum Bounded Degree Matroid Basis problem and the Minimum B...
AbstractIn the minimum-degree minimum spanning tree (MDMST) problem, we are given a graph G, and the...
In the Minimum Bounded Degree Spanning Tree problem, we are given an undirected graph G=(V,E) with a...
We present polynomial-time approximation algorithms for some degree-bounded directed network design ...
htmlabstractIterative rounding and relaxation have arguably become the method of choice in dealing w...
The main result of this paper is motivated by the following two apparently unrelated graph optimizat...
\newcommand{\subdG}[1][G]{#1^\star} Given a graph $G$ and a positive integer $k$, we study the que...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each ve...
A general instance of a Degree-Constrained Subgraph problem consists of an edge-weighted or vertex-w...
Abstract. In this paper, we study the minimum degree minimum span-ning tree problem: Given a graph G...
Cataloged from PDF version of article.Given an undirected network with positive edge costs and a pos...
AbstractIn this article we provide hardness results and approximation algorithms for the following t...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
Submodular functions are common in combinatorics; examples include the cut capacity function of a gr...
Given a connected graph G, a vertex v of G is said to be a branch vertex if its degree is greater th...