International audienceWe consider a generalization of the classical MAX-CUT problem where two objective functions are simultaneously considered. We derive some theorems on the existence and the non-existence of feasible cuts that are at the same time near optimal for both criteria. Furthermore, two approximation algorithms with performance guarantee are presented. The first one is deterministic while the second one is randomized. A generalization of these results is given for the bi-criteria MAX-k-CUT problem
We present a .699-approximation algorithm for max-bisection, i.e., partitioning the nodes of a weigh...
SL,BAEb#[1 programming based approximation algorithms, such as the Goemans and Williamson approximat...
This paper presents a canonical dual approach for finding either an optimal or approximate solution ...
AbstractWe consider a generalization of the classical MAX-CUT problem where two objective functions ...
AbstractWe consider the problem of partitioning the vertices of a weighted graph into two sets of si...
We consider the problem of partitioning the vertices of a weighted graph into two sets of sizes that...
We present randomized approximation algorithms for the maximum cut (MAX CUT) and maximum 2-satisfiab...
Abstract: "Polynomial-time approximation algorithms with non-trivial performance guarantees are pres...
This thesis investigates various computational approaches to the Maximum Cut problem. It is generall...
In this paper, we consider the max-cut problem as studied by Goemans and Williamson [8]. Since the p...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
The Max-Cut problem is a well known combinatorial optimization problem. In this paper we describe a ...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
AbstractMetric MAX-CUT is the problem of dividing a set of points in metric space into two parts so ...
We present a .699-approximation algorithm for max-bisection, i.e., partitioning the nodes of a weigh...
SL,BAEb#[1 programming based approximation algorithms, such as the Goemans and Williamson approximat...
This paper presents a canonical dual approach for finding either an optimal or approximate solution ...
AbstractWe consider a generalization of the classical MAX-CUT problem where two objective functions ...
AbstractWe consider the problem of partitioning the vertices of a weighted graph into two sets of si...
We consider the problem of partitioning the vertices of a weighted graph into two sets of sizes that...
We present randomized approximation algorithms for the maximum cut (MAX CUT) and maximum 2-satisfiab...
Abstract: "Polynomial-time approximation algorithms with non-trivial performance guarantees are pres...
This thesis investigates various computational approaches to the Maximum Cut problem. It is generall...
In this paper, we consider the max-cut problem as studied by Goemans and Williamson [8]. Since the p...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
The Max-Cut problem is a well known combinatorial optimization problem. In this paper we describe a ...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
AbstractMetric MAX-CUT is the problem of dividing a set of points in metric space into two parts so ...
We present a .699-approximation algorithm for max-bisection, i.e., partitioning the nodes of a weigh...
SL,BAEb#[1 programming based approximation algorithms, such as the Goemans and Williamson approximat...
This paper presents a canonical dual approach for finding either an optimal or approximate solution ...