We are pleased to dedicate this survey on kernelization of the Vertex Cover problem, to Professor Juraj Hromkovič on the occasion of his 60th birthday. The Vertex Cover problem is often referred to as the Drosophila of parameterized complexity. It enjoys a long history. New and worthy perspectives will always be demonstrated first with concrete results here. This survey discusses several research directions in Vertex Cover kernelization. The Barrier Degree of Vertex Cover is discussed. We have reduction rules that kernelize vertices of small degree, including in this paper new results that reduce graphs almost to minimum degree five. Can this process go on forever? What is the minimum vertex-degree barrier for polynomial-time kernelization?...
The field of kernelization studies polynomial-time preprocessing routines for hard problems in the f...
The Vertex Cover problem plays an essential role in the study of polynomial kernelization in paramet...
In this paper, we consider multi-objective evolutionary algorithms for the Vertex Cover problem in t...
25 pages, 10 figures. Appeared in volume 11011 of LNCS, pages 330-356, see Reference [29] in the tex...
A variety of efficient kernelization strategies for the classic vertex cover problem are developed,...
In the NP-complete problem Vertex Cover, one is given a graph G and an integer k and are asked wheth...
Vertex Cover is one of the most well studied problems in the realm of parameterized algorithms and a...
Kernelization is a concept that enables the formal mathematical analysis of data reduction through t...
We study the kernelization complexity of structural parameterizations of the Vertex Cover problem. H...
In the Maximum Minimal Vertex Cover (MMVC) problem, we are given a graph G and a positive integer k,...
We study the kernelization complexity of structural parameterizations of the Vertex Cover problem. H...
The purpose of this thesis is to give a mathematical analysis of the power of data reduction for dea...
The vertex cover problem is one of a handful of problems for which kernelization—the repeated reduci...
The Vertex Cover problem plays an essential role in the study of polynomial kernelization in paramet...
Summary form only given. Two kernelization methods for the vertex cover problem are investigated. Th...
The field of kernelization studies polynomial-time preprocessing routines for hard problems in the f...
The Vertex Cover problem plays an essential role in the study of polynomial kernelization in paramet...
In this paper, we consider multi-objective evolutionary algorithms for the Vertex Cover problem in t...
25 pages, 10 figures. Appeared in volume 11011 of LNCS, pages 330-356, see Reference [29] in the tex...
A variety of efficient kernelization strategies for the classic vertex cover problem are developed,...
In the NP-complete problem Vertex Cover, one is given a graph G and an integer k and are asked wheth...
Vertex Cover is one of the most well studied problems in the realm of parameterized algorithms and a...
Kernelization is a concept that enables the formal mathematical analysis of data reduction through t...
We study the kernelization complexity of structural parameterizations of the Vertex Cover problem. H...
In the Maximum Minimal Vertex Cover (MMVC) problem, we are given a graph G and a positive integer k,...
We study the kernelization complexity of structural parameterizations of the Vertex Cover problem. H...
The purpose of this thesis is to give a mathematical analysis of the power of data reduction for dea...
The vertex cover problem is one of a handful of problems for which kernelization—the repeated reduci...
The Vertex Cover problem plays an essential role in the study of polynomial kernelization in paramet...
Summary form only given. Two kernelization methods for the vertex cover problem are investigated. Th...
The field of kernelization studies polynomial-time preprocessing routines for hard problems in the f...
The Vertex Cover problem plays an essential role in the study of polynomial kernelization in paramet...
In this paper, we consider multi-objective evolutionary algorithms for the Vertex Cover problem in t...