AbstractThe best approximation algorithm for Max Cut in graphs of maximum degree 3 uses semidefinite programming, has approximation ratio 0.9326, and its running time is Θ(n3.5logn); but the best combinatorial algorithms have approximation ratio 4/5 only, achieved in O(n2) time [J.A. Bondy, S.C. Locke, J. Graph Theory 10 (1986) 477–504; E. Halperin, et al., J. Algorithms 53 (2004) 169–185]. Here we present an improved combinatorial approximation, which is a 5/6-approximation algorithm that runs in O(n2) time, perhaps improvable even to O(n). Our main tool is a new type of vertex decomposition for graphs of maximum degree 3
In this paper we compare, from a practical point of view, approximation algorithms for the problem M...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
Abstract: "Polynomial-time approximation algorithms with non-trivial performance guarantees are pres...
The best approximation algorithm for Max Cut in graphs of maximum degree 3 uses semidefinite program...
We present an improved semidefinite programming based approximation algorithm for the MAX CUT prob-l...
In a second seminal paper on the application of semidefinite programming to graph partitioning probl...
Let ff ' 0:87856 denote the best approximation ratio currently known for the Max Cut problem o...
We consider the Max--Section problem, where we are given an undirected graph G=(V,E)equipped with no...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
© 2019 American Institute of Mathematical Sciences. All rights reserved. The Max-Cut problem is a we...
We deal with the maximum cut problem on cubic graphs and we present a simple O(log n) time parallel ...
AbstractWe consider the problem of partitioning the vertices of a weighted graph into two sets of si...
AbstractAn approximation algorithm for the maximum cut problem is designed and analyzed; its perform...
In this paper we compare, from a practical point of view, approximation algorithms for the problem M...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
Abstract: "Polynomial-time approximation algorithms with non-trivial performance guarantees are pres...
The best approximation algorithm for Max Cut in graphs of maximum degree 3 uses semidefinite program...
We present an improved semidefinite programming based approximation algorithm for the MAX CUT prob-l...
In a second seminal paper on the application of semidefinite programming to graph partitioning probl...
Let ff ' 0:87856 denote the best approximation ratio currently known for the Max Cut problem o...
We consider the Max--Section problem, where we are given an undirected graph G=(V,E)equipped with no...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
© 2019 American Institute of Mathematical Sciences. All rights reserved. The Max-Cut problem is a we...
We deal with the maximum cut problem on cubic graphs and we present a simple O(log n) time parallel ...
AbstractWe consider the problem of partitioning the vertices of a weighted graph into two sets of si...
AbstractAn approximation algorithm for the maximum cut problem is designed and analyzed; its perform...
In this paper we compare, from a practical point of view, approximation algorithms for the problem M...
The max-cut problem asks for partitioning the nodes V of a graph G=(V,E) into two sets (one of which...
Abstract: "Polynomial-time approximation algorithms with non-trivial performance guarantees are pres...