In recent years, balanced network optimization problems play an important role in practice, especially in information transmission, industry production and logistics management. In this paper, we consider some logistics optimization problems related to the optimal tree structures in a network. We show that the most optimal subtree problem is NP-hard by transforming the connected dominating set problem into this model. By constructing the network models of the most balanced spanning tree problem with edge set restrictions, and by finding the optimal subtrees in special networks, we present efficient computational methods for solving some logistics problems. doi:10.1017/S144618111700007
[[abstract]]Let G = (V, E, w) be an undirected graph with nonnegative edge length function w and non...
[[abstract]]Let G(N; A) be a connected, undirected and weighted network with node set N and edge set...
The problem of minimal cost partial spanning trees is well known as the NP-complete Steiner problem ...
AbstractIn this paper, various optimality problems (such as the shortest route, most reliable route ...
This paper is a survey of recent improvements in algorithms for four classical network optimization ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
Finding a minimum spanning tree in a given network is a famous combinatorial optimization problem th...
In telecommunication networks based on the current Ethernet technology, routing of traffic demands i...
International audienceFor the study and the solving of NP-hard problems, the concept of tree decompo...
We study three combinatorial problems arising in telecommunication and transportation. First, the bu...
A number of basic results concerning tree optimization problems are presented. As well as treating t...
This paper examines the complexity of distributed algorithms for finding a Minimum Spanning Tree in ...
In this paper, we have done a rapid and very simple algorithm that resolves the multiple objective c...
[[abstract]]Given an undirected graph with nonnegative edge lengths and nonnegative vertex weights, ...
[[abstract]]Let G = (V, E, w) be an undirected graph with nonnegative edge length function w and non...
[[abstract]]Let G(N; A) be a connected, undirected and weighted network with node set N and edge set...
The problem of minimal cost partial spanning trees is well known as the NP-complete Steiner problem ...
AbstractIn this paper, various optimality problems (such as the shortest route, most reliable route ...
This paper is a survey of recent improvements in algorithms for four classical network optimization ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
Finding a minimum spanning tree in a given network is a famous combinatorial optimization problem th...
In telecommunication networks based on the current Ethernet technology, routing of traffic demands i...
International audienceFor the study and the solving of NP-hard problems, the concept of tree decompo...
We study three combinatorial problems arising in telecommunication and transportation. First, the bu...
A number of basic results concerning tree optimization problems are presented. As well as treating t...
This paper examines the complexity of distributed algorithms for finding a Minimum Spanning Tree in ...
In this paper, we have done a rapid and very simple algorithm that resolves the multiple objective c...
[[abstract]]Given an undirected graph with nonnegative edge lengths and nonnegative vertex weights, ...
[[abstract]]Let G = (V, E, w) be an undirected graph with nonnegative edge length function w and non...
[[abstract]]Let G(N; A) be a connected, undirected and weighted network with node set N and edge set...
The problem of minimal cost partial spanning trees is well known as the NP-complete Steiner problem ...