Add to ORKGOne of the central parts in the study of combinatorial optimization is to classify the NP-hard optimization problems in terms of their approximability. In this thesis we study the Minimum Vertex Cover (Min-VC) problem and the Minimum Dominating Set (Min-DS) problem in the context of so called power law graphs. This family of graphs is motivated by recent findings on the degree distribution of existing real-world networks such as the Internet, the World-Wide Web, biological networks and social networks. In a power law graph the number of nodes yi of a given degree i is proportional to i-ß, that is, the distribution of node degrees follows a power law. The parameter ß > 0 is the so called power law exponent. With the aim of classifying the ab...
For a given graph G over n vertices, let OPT G denote the size of an optimal solution in G of a part...
AbstractIn this paper we consider a graph optimization problem called minimum monopoly problem, in w...
AbstractWe study low degree graph problems such as Maximum Independent Set and Minimum Vertex Cover....
AbstractOur motivation for this work is the remarkable discovery that many large-scale real-world gr...
AbstractThe remarkable discovery of many large-scale real networks is the power-law distribution in ...
A Minimum Vertex Cover is the smallest set of vertices whose removal completely dis-connects a graph...
In this paper we construct an approximation algorithm for theMinimum Vertex Cover Problem (Min-VC) w...
AbstractGiven a (directed or undirected) graph with edge costs, the power of a node is the maximum c...
Large real-world networks typically follow a power-law degree distribution. To study such networks, ...
Article implements and tests the performances of several approximation algorithms for computing the ...
We present an overview of the approximation theory in combinatorial optimization. As an applicatio...
AbstractWe study approximation hardness of the Minimum Dominating Set problem and its variants in un...
This thesis presents approximation algorithms for some NP-Hard combinatorial optimization problems o...
We give logarithmic lower bounds for the approximability of theMinimum Dominating Set problem in con...
AbstractWe provide new non-approximability results for the restrictions of the Min Vertex Cover prob...
For a given graph G over n vertices, let OPT G denote the size of an optimal solution in G of a part...
AbstractIn this paper we consider a graph optimization problem called minimum monopoly problem, in w...
AbstractWe study low degree graph problems such as Maximum Independent Set and Minimum Vertex Cover....
AbstractOur motivation for this work is the remarkable discovery that many large-scale real-world gr...
AbstractThe remarkable discovery of many large-scale real networks is the power-law distribution in ...
A Minimum Vertex Cover is the smallest set of vertices whose removal completely dis-connects a graph...
In this paper we construct an approximation algorithm for theMinimum Vertex Cover Problem (Min-VC) w...
AbstractGiven a (directed or undirected) graph with edge costs, the power of a node is the maximum c...
Large real-world networks typically follow a power-law degree distribution. To study such networks, ...
Article implements and tests the performances of several approximation algorithms for computing the ...
We present an overview of the approximation theory in combinatorial optimization. As an applicatio...
AbstractWe study approximation hardness of the Minimum Dominating Set problem and its variants in un...
This thesis presents approximation algorithms for some NP-Hard combinatorial optimization problems o...
We give logarithmic lower bounds for the approximability of theMinimum Dominating Set problem in con...
AbstractWe provide new non-approximability results for the restrictions of the Min Vertex Cover prob...
For a given graph G over n vertices, let OPT G denote the size of an optimal solution in G of a part...
AbstractIn this paper we consider a graph optimization problem called minimum monopoly problem, in w...
AbstractWe study low degree graph problems such as Maximum Independent Set and Minimum Vertex Cover....