The k-MST problem requires finding that subset of at least k vertices of a given graph whose Minimum Spanning Tree has least weight amongst all subsets of at least k vertices, There has been much work on this problem recently, culminating in an approximation algorithm by Garg, which finds a subset of k vertices whose MST has weight at most 3 times the optimal. Garg also argued that a factor of 3 cannot be improved unless lower bounds different from his are used. This argument applies only to the rooted case of the problem. When no root vertex is specified, we show how to use a pruning technique on top of Garg's algorithm to achieve an approximation factor of 2.5. Note that Garg's algorithm is based upon the Goemans-Williamson clustering met...
The ST ST is a sub-tree of the original network so that the network graph can contain more than one ...
The covering Steiner problem is a generalization of both the k-MST and the group Steiner problems: g...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
The k-MST problem requires finding that subset of at least k vertices of a given graph whose Minimum...
Given an undirected graph with non-negative edge costs and an integer k, the k-MST problem is that ...
In this paper we give a 3-approximation algorithm for the problem of finding a minimum tree spanning...
AbstractThe minimum vertex ranking spanning tree problem (MVRST) is to find a spanning tree of G who...
Given a complete undirected graph with the nodes partitioned into m node sets called clusters, the G...
AbstractGiven an undirected graph with nonnegative edge costs and an integerk, thek-MST problem is t...
Given a complete graph on n nodes with metric edge costs, the minimum-cost khop spanning tree (kHMST...
In this paper we consider the well known NP-hard problem k-MST. We aregiven a weighted complete grap...
Garg [10] gives two approximation algorithms for the minimum-cost tree spanning k vertices in an und...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
The ST ST is a sub-tree of the original network so that the network graph can contain more than one ...
The covering Steiner problem is a generalization of both the k-MST and the group Steiner problems: g...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
The k-MST problem requires finding that subset of at least k vertices of a given graph whose Minimum...
Given an undirected graph with non-negative edge costs and an integer k, the k-MST problem is that ...
In this paper we give a 3-approximation algorithm for the problem of finding a minimum tree spanning...
AbstractThe minimum vertex ranking spanning tree problem (MVRST) is to find a spanning tree of G who...
Given a complete undirected graph with the nodes partitioned into m node sets called clusters, the G...
AbstractGiven an undirected graph with nonnegative edge costs and an integerk, thek-MST problem is t...
Given a complete graph on n nodes with metric edge costs, the minimum-cost khop spanning tree (kHMST...
In this paper we consider the well known NP-hard problem k-MST. We aregiven a weighted complete grap...
Garg [10] gives two approximation algorithms for the minimum-cost tree spanning k vertices in an und...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...
The ST ST is a sub-tree of the original network so that the network graph can contain more than one ...
The covering Steiner problem is a generalization of both the k-MST and the group Steiner problems: g...
Finding low-cost spanning subgraphs with given degree and connectivity requirements is a fundamental...