Many applications in discrete optimization lead to hard problems. Under common assumption, it is impossible to find an algorithm that (1) is efficient, (2) finds an optimal solution on (3) every instance. At least one of these requirements needs to be sacrificed to cope with these problems. In the area of approximation algorithms, the goal is to design algorithms that efficiently find provably good solutions. Typically, for approximation algorithms, provably good implies that we bound the approximation ratio of the value of the solution to the optimal value. One important reason for studying approximation algorithms is that often even on simplified problems, they give us insights in how to design heuristics for the real problem that needs t...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...
problems admit no algorithms that simultaneously (1) find optimal solution (2) in polynomial time (3...
In order to define a polynomial approximation theory linked to combinatorial optimization closer tha...
Many applications in discrete optimization lead to hard problems. Under common assumption, it is imp...
We formalize the concept of additive approximation schemes and apply it to load balancing problems o...
AbstractApproximation algorithms may be inevitable choice when it comes to the solution of difficult...
Discrete optimization problems are everywhere, from traditional operations research planning problem...
One can try to parametrize the set of the instances of an optimization prob-lem and look for in poly...
There is a long history of approximation schemes for the problem of scheduling jobs on identical mac...
In a combinatorial optimization problem, when given an input instance, one seeks a feasible solution...
We introduce a new framework for designing and analyzing algorithms. Our framework applies best to p...
In this note we discuss some drawbacks of some approaches to the classification of NP-complete optim...
. In the past few years, there has been significant progress in our understanding of the extent to w...
In this paper we develop an easily applicable algorithmic technique/tool for developing approximatio...
AbstractThis paper presents the main results obtained in the field of approximation algorithms in a ...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...
problems admit no algorithms that simultaneously (1) find optimal solution (2) in polynomial time (3...
In order to define a polynomial approximation theory linked to combinatorial optimization closer tha...
Many applications in discrete optimization lead to hard problems. Under common assumption, it is imp...
We formalize the concept of additive approximation schemes and apply it to load balancing problems o...
AbstractApproximation algorithms may be inevitable choice when it comes to the solution of difficult...
Discrete optimization problems are everywhere, from traditional operations research planning problem...
One can try to parametrize the set of the instances of an optimization prob-lem and look for in poly...
There is a long history of approximation schemes for the problem of scheduling jobs on identical mac...
In a combinatorial optimization problem, when given an input instance, one seeks a feasible solution...
We introduce a new framework for designing and analyzing algorithms. Our framework applies best to p...
In this note we discuss some drawbacks of some approaches to the classification of NP-complete optim...
. In the past few years, there has been significant progress in our understanding of the extent to w...
In this paper we develop an easily applicable algorithmic technique/tool for developing approximatio...
AbstractThis paper presents the main results obtained in the field of approximation algorithms in a ...
Integer programming formulations play a key role in the design of efficient algorithms and approxima...
problems admit no algorithms that simultaneously (1) find optimal solution (2) in polynomial time (3...
In order to define a polynomial approximation theory linked to combinatorial optimization closer tha...